  
  
  [1XIndex[101X
  
  [10X*[110X  4.13
  [10X*[110X, for character tables  71.7
  [10X+[110X  4.13
  [10X-[110X  4.13
  [10X-A[110X  3.1
  [10X-a[110X  3.1
  [10X-B[110X  3.1
  [10X-b[110X  3.1
  [10X-C[110X  3.1
  [10X-D[110X  3.1
  [10X-E[110X  3.1
  [10X-e[110X  3.1
  [10X-f[110X  3.1
  [10X-g[110X  3.1
  [10X-g -g[110X  3.1
  [10X-h[110X  3.1
  [10X-i[110X  3.1
  [2X-infinity[102X  18.2-1
  [10X-K[110X  3.1
  [10X-L[110X  3.1
  [10X-l[110X  3.1
  [10X-M[110X  3.1
  [10X-m[110X  3.1
  [10X-n[110X  3.1
  [10X-O[110X  3.1
  [10X-o[110X  3.1
  [10X-P[110X  3.1
  [10X-p[110X  3.1
  [10X-q[110X  3.1
  [10X-R[110X  3.1
  [10X-r[110X  3.1
  [10X-s[110X  3.1
  [10X-T[110X  3.1
  [10X-U[110X  3.1
  [10X-W[110X  3.1
  [10X-X[110X  3.1
  [10X-x[110X  3.1
  [10X-y[110X  3.1
  [10X-z[110X  3.1
  [10X/[110X  4.13
  [10X/[110X, for character tables  71.7
  [10X\"[110X  27.2
  [10X\'[110X  27.2
  [2X\*[102X  31.12-1
  [2X\*[102X (for pcwords)  46.2-2
  [10X\*[110X, for transformations  53.4
  [2X\+[102X  31.12-1
  [2X\.[102X  29.7-3
  [2X\.\:\=[102X  29.7-3
  [2X\/[102X  31.12-1
  [2X\/[102X (for a free group and a list of elements)  47.2-1
  [2X\/[102X (for a free semigroup and a list of pairs of elements)  52.2-1
  [2X\/[102X (for a free monoid and a list of pairs of elements)  52.5-1
  [10X\/[110X, for a transformation and a permutation  53.4
  [2X\<[102X (for two strings)  27.6-2
  [2X\<[102X  31.11-1
  [2X\<[102X (for nonassociative words)  36.2-2
  [2X\<[102X (for associative words)  37.3-2
  [2X\<[102X (for permutations)  42.2-1
  [2X\<[102X (for pcwords)  46.2-1
  [2X\<[102X (for two elements in a f.p. group)  47.3-2
  [10X\<[110X, for transformations  53.4
  [2X\=[102X (for two strings)  27.6-1
  [2X\=[102X  31.11-1
  [2X\=[102X (for nonassociative words)  36.2-1
  [2X\=[102X (for associative words)  37.3-1
  [2X\=[102X (for permutations)  42.2-1
  [2X\=[102X (for pcwords)  46.2-1
  [2X\=[102X (for two elements in a f.p. group)  47.3-1
  [2X\=[102X (for two elements in a f.p. semigroup)  52.3-1
  [10X\=[110X, for transformations  53.4
  [2X\[\][102X  21.2-1
  [2X\[\]\:\=[102X  21.2-1
  [10X\\[110X  27.2
  [2X\^[102X  31.12-1
  [2X\^[102X (for a field and an integer)  61.9-4
  [2X\^[102X (for a field and a pair of integers)  61.9-5
  [10X\^[110X, for a positive integer and a transformation  53.4
  [10X\^[110X, for a transformation and a permutation  53.4
  [10X\b[110X  27.2
  [10X\c[110X  27.2
  [2X\in[102X (for strictly sorted lists)  21.19-1
  [2X\in[102X (element test for lists)  21.8-1
  [2X\in[102X (for a collection)  30.6-1
  [2X\mod[102X (for residue class rings)  14.5-1
  [2X\mod[102X  31.12-1
  [2X\mod[102X (for two pcgs)  45.9-5
  [10X\r[110X  27.2
  [10X\XYZ[110X  27.2
  [2X\{\}[102X  21.3-1
  [2X\{\}\:\=[102X  21.4-1
  [10X^[110X  4.13
  [10X^[110X, for class functions  72.4
  abelian number field  60.2-3
  abelian number fields, CanonicalBasis  60.3
  abelian number fields, Galois group  60.4
  [2XAbelianGroup[102X  50.1-3
  [2XAbelianInvariants[102X  39.16-1
  [2XAbelianInvariants[102X (for a character table)  71.8-5
  [10XAbelianInvariants[110X, for groups  39.16-1
  [2XAbelianInvariantsMultiplier[102X  39.24-3
  [2XAbelianInvariantsNormalClosureFpGroup[102X  47.15-4
  [2XAbelianInvariantsNormalClosureFpGroupRrs[102X  47.15-5
  [2XAbelianInvariantsOfList[102X  25.2-10
  [2XAbelianInvariantsSubgroupFpGroup[102X  47.15-1
  [2XAbelianInvariantsSubgroupFpGroupMtc[102X  47.15-2
  [2XAbelianInvariantsSubgroupFpGroupRrs[102X (for a group and a coset table)  47.15-3
  [2XAbelianInvariantsSubgroupFpGroupRrs[102X (for two groups)  47.15-3
  [2XAbelianNumberField[102X  60.1-2
  [2XAbelianSubfactorAction[102X  41.8-3
  About [5XGAP[105X manual  1.
  [2XAbsInt[102X  14.2-6
  absolute value of an integer  14.2-6
  [2XAbsoluteDiameter[102X  19.2-4
  [2XAbsoluteIrreducibleModules[102X  71.15-2
  [2XAbsolutelyIrreducibleModules[102X  71.15-2
  [2XAbsoluteValue[102X  18.1-8
  [2XAbsolutIrreducibleModules[102X  71.15-2
  abstract word  36.1-1
  [2XAbstractWordTietzeWord[102X  48.3-2
  accessing, list elements  21.3
  accessing, record elements  29.2
  [2XAClosestVectorCombinationsMatFFEVecFFE[102X  23.6-5
  [2XAClosestVectorCombinationsMatFFEVecFFECoords[102X  23.6-5
  [2XAcos[102X  19.2-1
  [2XAcosh[102X  19.2-1
  [2XActingAlgebra[102X  62.11-13
  [2XActingDomain[102X  41.12-3
  [2XAction[102X (for a group, an action domain, etc.)  41.7-2
  [2XAction[102X (for an external set)  41.7-2
  action, by conjugation  41.2-1
  action, on blocks  41.2-4
  action, on sets  41.2-4
  [2XActionHomomorphism[102X (for a group, an action domain, etc.)  41.7-1
  [2XActionHomomorphism[102X (for an action image)  41.7-1
  [2XActionHomomorphism[102X (for an external set)  41.7-1
  actions  41.2
  [2XActivateProfileColour[102X  7.7-18
  [2XActorOfExternalSet[102X  41.12-15
  [2XAdd[102X  21.4-2
  add, an element to a set  21.19-4
  [2XAddCoeffs[102X  23.4-2
  [2XAddDictionary[102X  28.3-4
  [2XAddGenerator[102X  48.5-1
  [2XAddGeneratorsExtendSchreierTree[102X  43.11-10
  addition  4.13
  addition, list and non-list  21.13-3
  addition, matrices  24.3
  addition, matrix and scalar  24.3
  addition, operation  31.12-1
  addition, rational functions  66.2
  addition, scalar and matrix  24.3
  addition, scalar and matrix list  24.3
  addition, scalar and matrix list  24.3
  addition, vector and scalar  23.2
  addition, vectors  23.2
  [2XAdditiveInverse[102X  31.10-9
  [2XAdditiveInverseAttr[102X  31.10-9
  [2XAdditiveInverseImmutable[102X  31.10-9
  [2XAdditiveInverseMutable[102X  31.10-9
  [2XAdditiveInverseOp[102X  31.10-9
  [2XAdditiveInverseSameMutability[102X  31.10-9
  [2XAdditiveInverseSM[102X  31.10-9
  [2XAdditiveNeutralElement[102X  55.3-5
  [2XAddRelator[102X  48.5-3
  [2XAddRowVector[102X  23.4-1
  [2XAddRule[102X  38.1-9
  [2XAddRuleReduced[102X  38.1-10
  [2XAddSet[102X  21.19-4
  [2XAdjointAssociativeAlgebra[102X  64.9-2
  [2XAdjointBasis[102X  62.9-5
  [2XAdjointMatrix[102X  64.9-1
  [2XAdjointModule[102X  62.11-19
  [2XAffineAction[102X  45.14-4
  [2XAffineActionLayer[102X  45.14-5
  [2XAgemo[102X  39.14-2
  [2XAlgebra[102X  62.2-1
  [2XAlgebraByStructureConstants[102X  62.4-1
  [2XAlgebraGeneralMappingByImages[102X  62.10-1
  [2XAlgebraHomomorphismByImages[102X  62.10-2
  [2XAlgebraHomomorphismByImagesNC[102X  62.10-3
  [2XAlgebraicExtension[102X  67.1-1
  [2XAlgebraWithOne[102X  62.2-2
  [2XAlgebraWithOneGeneralMappingByImages[102X  62.10-4
  [2XAlgebraWithOneHomomorphismByImages[102X  62.10-5
  [2XAlgebraWithOneHomomorphismByImagesNC[102X  62.10-6
  [2XAllAutomorphisms[102X  40.9-3
  [2XAllBlocks[102X  41.11-4
  [2XAllEndomorphisms[102X  40.9-3
  [2XAllHomomorphismClasses[102X  40.9-2
  [2XAllHomomorphisms[102X  40.9-3
  [2XAllIrreducibleSolvableGroups[102X  50.11-3
  [10XAll[3XLibrary[103X[10XGroups[110X  50.5
  [10XAllPrimitiveGroups[110X  50.5
  [2XAllSmallGroups[102X  50.7-2
  [2XAllSmallNonabelianSimpleGroups[102X  39.15-16
  [2XAllSubgroups[102X  39.19-5
  [10XAllTransitiveGroups[110X  50.5
  [2XAlpha[102X  75.2-1
  [2XAlternatingGroup[102X (for a degree)  50.1-9
  [2XAlternatingGroup[102X (for a domain)  50.1-9
  [9Xand[109X  20.4-2
  [9Xand[109X, for filters  13.2
  [9Xand[109X, for filters  20.4-2
  [2XANFAutomorphism[102X  60.4-2
  [2XAntiIsomorphismTransformationSemigroup[102X  53.7-6
  antisymmetric relation  33.2-4
  [2XAntiSymmetricParts[102X  72.11-3
  [2XAppend[102X  21.4-5
  [2XAppendTo[102X (for streams)  10.4-4
  [2XAppendTo[102X  9.7-3
  [2XApplicableMethod[102X  7.2-1
  [2XApplicableMethodTypes[102X  7.2-1
  [2XApply[102X  21.20-10
  [2XApplySimpleReflection[102X  64.7-4
  [2XApproximateSuborbitsStabilizerPermGroup[102X  43.10-15
  [2XARCH_IS_MAC_OS_X[102X  3.4-2
  [2XARCH_IS_UNIX[102X  3.4-1
  [2XARCH_IS_WINDOWS[102X  3.4-3
  [10Xarg[110X, special function argument  4.23
  [10Xarg[110X, special function argument, calling with  4.11-1
  [2XArgument[102X (for complex numbers)  19.2-1
  arithmetic operators, precedence  4.13
  [2XArithmeticElementCreator[102X  80.9-1
  [2XArrangements[102X  16.2-4
  arrow notation for functions  4.23
  [2XAsAlgebra[102X  62.9-7
  [2XAsAlgebraWithOne[102X  62.9-8
  [2XAsBinaryRelationOnPoints[102X (for a binary relation)  33.3-3
  [2XAsBinaryRelationOnPoints[102X (for a permutation)  33.3-3
  [2XAsBinaryRelationOnPoints[102X (for a transformation)  33.3-3
  [2XAsBlockMatrix[102X  24.17-1
  [2XAscendingChain[102X  39.17-16
  [2XAsDivisionRing[102X  58.1-9
  [2XAsDuplicateFreeList[102X  21.20-5
  [2XAsField[102X  58.1-9
  [2XAsGroup[102X  39.2-5
  [2XAsGroupGeneralMappingByImages[102X  40.1-5
  [2XAsin[102X  19.2-1
  [2XAsinh[102X  19.2-1
  [2XAsInternalFFE[102X  59.2-6
  [2XAsLeftIdeal[102X  56.2-11
  [2XAsLeftModule[102X  57.1-5
  [2XAsList[102X  30.3-8
  [2XAsMagma[102X  35.2-10
  [2XAsMonoid[102X  51.2-5
  [2XAsPartialPerm[102X (for a permutation and a positive integer)  54.4-1
  [2XAsPartialPerm[102X (for a permutation and a set of
      positive integers)  54.4-1
  [2XAsPartialPerm[102X (for a permutation)  54.4-1
  [2XAsPartialPerm[102X (for a transformation and a
        positive integer)  54.4-2
  [2XAsPartialPerm[102X (for a transformation and a
        set of positive integer)  54.4-2
  [2XAsPartialPerm[102X (for a transformation)  54.4-2
  [2XAsPermutation[102X  42.5-5
  [2XAsPolynomial[102X  66.4-5
  [2XAsRightIdeal[102X  56.2-11
  [2XAsSemigroup[102X  51.1-6
  [2XAssert[102X  7.5-3
  [2XAssertionLevel[102X  7.5-2
  [2XAsSet[102X  30.3-10
  [2XAssignGeneratorVariables[102X  37.2-3
  assignment, to a list  21.4
  assignment, to a record  29.3
  assignment, variable  4.15
  [2XAssignNiceMonomorphismAutomorphismGroup[102X  40.8-1
  [2XAssociatedPartition[102X  16.2-28
  [2XAssociatedReesMatrixSemigroupOfDClass[102X  51.9-11
  [2XAssociates[102X  56.5-4
  associativity  4.13
  [2XAssocWordByLetterRep[102X  37.6-9
  [2XAsSortedList[102X  30.3-9
  [2XAsSSortedList[102X  30.3-10
  [10XAs[3XStruct[103X[10X[110X  31.4
  [2XAsSubalgebra[102X  62.9-9
  [2XAsSubalgebraWithOne[102X  62.9-10
  [2XAsSubgroup[102X  39.3-4
  [2XAsSubgroupOfWholeGroupByQuotient[102X  47.13-3
  [2XAsSubmagma[102X  35.2-11
  [2XAsSubmonoid[102X  51.2-6
  [2XAsSubsemigroup[102X  51.1-7
  [2XAsSubspace[102X  61.2-4
  [10XAsSub[3Xstruct[103X[10X[110X  31.8
  [2XAsTransformation[102X  53.3-1
  [2XAsTwoSidedIdeal[102X  56.2-11
  [2XAsVectorSpace[102X  61.2-3
  at exit functions  6.7
  [2XAtan[102X  19.2-1
  [2XAtan2[102X  19.2-1
  [2XAtanh[102X  19.2-1
  [2XAtlasIrrationality[102X  18.4-6
  atomic irrationalities  18.4
  [2XAttributeValueNotSet[102X  13.6-3
  [2XAugmentationIdeal[102X  65.1-7
  [2XAugmentedCosetTableInWholeGroup[102X  47.9-1
  [2XAugmentedCosetTableMtc[102X  47.9-2
  [2XAugmentedCosetTableRrs[102X  47.9-3
  automatic loading of GAP packages  76.2
  automorphism group, of number fields  60.4
  [2XAutomorphismDomain[102X  40.7-3
  [2XAutomorphismGroup[102X  40.7-1
  [10XAutomorphismGroup[110X, for groups with pcgs  45.16
  [2XAutomorphismsOfTable[102X  71.9-4
  [22Xb_N[122X (irrational value)  18.4-1
  backslash character  27.2
  backspace character  27.2
  Backtrace, GAP3 name for Where  6.4-5
  [10XBANNER[110X  77.4
  [2XBaseFixedSpace[102X  24.7-8
  [2XBaseIntersectionIntMats[102X  25.1-5
  [2XBaseIntMat[102X  25.1-4
  [2XBaseMat[102X  24.11-1
  [2XBaseMatDestructive[102X  24.11-2
  [2XBaseOfGroup[102X  43.10-2
  [2XBaseOrthogonalSpaceMat[102X  24.11-3
  [2XBaseStabChain[102X  43.10-1
  [2XBaseSteinitzVectors[102X  24.11-5
  [2XBasicSpinRepresentationOfSymmetricGroup[102X  39.24-9
  [2XBasicWreathProductOrdering[102X  34.4-11
  [2XBasis[102X  61.5-2
  [2XBasisNC[102X  61.5-2
  [2XBasisVectors[102X  61.6-1
  [2XBell[102X  16.1-3
  [2XBernoulli[102X  16.1-4
  [2XBestQuoInt[102X  14.3-2
  [2XBestSplittingMatrix[102X  71.17-5
  [2XBiAlgebraModule[102X  62.11-6
  [2XBiAlgebraModuleByGenerators[102X  62.11-3
  [2XBibEntry[102X  76.3-14
  [2XBilinearFormMat[102X  64.6-13
  binary relation  33.
  [2XBinaryRelationByElements[102X  33.1-2
  [2XBinaryRelationOnPoints[102X  33.3-1
  [2XBinaryRelationOnPointsNC[102X  33.3-1
  [2XBindGlobal[102X  4.9-7
  [2XBinomial[102X  16.1-2
  [2XBisectInterval[102X  19.2-4
  blank  4.4
  [2XBlistList[102X  22.2-1
  [2XBlockMatrix[102X  24.17-2
  [2XBlocks[102X (for a group, an action domain, etc.)  41.11-1
  [2XBlocks[102X (for an external set)  41.11-1
  [2XBlocksInfo[102X  71.11-3
  [2XBlownUpMat[102X  24.13-3
  [2XBlownUpVector[102X  24.13-4
  [2XBlowupInterval[102X  19.2-4
  [2XBlowUpIsomorphism[102X  44.3-3
  body  4.23
  [2XBombieriNorm[102X  66.12-1
  bound  4.8
  Brauer character  72.8-1
  [2XBrauerCharacterValue[102X  72.15-2
  [2XBrauerTable[102X (for a character table, and a prime integer)  71.3-2
  [2XBrauerTable[102X (for a group, and a prime integer)  71.3-2
  [2XBrauerTableOp[102X  71.3-2
  [2XBravaisGroup[102X  44.6-11
  [2XBravaisSubgroups[102X  44.6-12
  [2XBravaisSupergroups[102X  44.6-13
  Break loop message  6.4-4
  [9Xbreak[109X statement  4.21
  browsing backwards  2.2
  browsing backwards one chapter  2.2
  browsing forward  2.2
  browsing forward one chapter  2.2
  browsing the next section browsed  2.2
  browsing the previous section browsed  2.2
  [22Xc_N[122X (irrational value)  18.4-1
  [2XCallFuncList[102X  5.2-1
  [2XCallWithTimeout[102X  5.3-1
  [2XCallWithTimeoutList[102X  5.3-1
  [2XCanComputeIndex[102X  39.25-5
  [2XCanComputeIsSubset[102X  39.25-6
  [2XCanComputeSize[102X  39.25-3
  [2XCanComputeSizeAnySubgroup[102X  39.25-4
  candidates, for permutation characters  72.13
  [2XCanEasilyCompareElements[102X  31.11-2
  [2XCanEasilyCompareElementsFamily[102X  31.11-2
  [2XCanEasilyComputePcgs[102X  45.2-3
  [2XCanEasilyComputeWithIndependentGensAbelianGroup[102X  39.25-2
  [2XCanEasilySortElements[102X  31.11-2
  [2XCanEasilySortElementsFamily[102X  31.11-2
  [2XCanEasilyTestMembership[102X  39.25-1
  canonical basis, for matrix spaces  61.9-10
  canonical basis, for row spaces  61.9-9
  [2XCanonicalBasis[102X  61.5-3
  [2XCanonicalGenerators[102X  64.6-14
  [2XCanonicalPcElement[102X  45.5-9
  [2XCanonicalPcgs[102X  45.8-2
  [2XCanonicalPcgsByGeneratorsWithImages[102X  45.9-7
  [2XCanonicalRepresentativeDeterminatorOfExternalSet[102X  41.12-14
  [2XCanonicalRepresentativeOfExternalSet[102X  41.12-13
  [2XCanonicalRightCosetElement[102X  39.7-3
  Carmichael's lambda function  15.2-3
  carriage return character  27.2
  [2XCartanMatrix[102X  64.6-12
  [2XCartanSubalgebra[102X  64.3-7
  [2XCartesian[102X (for a list)  21.20-16
  [2XCartesian[102X (for various objects)  21.20-16
  [2XCategoriesOfObject[102X  13.3-1
  [2XCategoryCollections[102X  30.2-4
  [2XCategoryFamily[102X  79.1-2
  [2XCeil[102X  19.2-1
  center  35.4-4
  [2XCenter[102X  35.4-5
  central character  72.8-17
  [2XCentralCharacter[102X  72.8-17
  [2XCentralIdempotentsOfAlgebra[102X  62.9-17
  centraliser  35.4-4
  [2XCentralizer[102X (for a class of objects in a magma)  35.4-4
  [2XCentralizer[102X (for a magma and a submagma)  35.4-4
  [2XCentralizer[102X (for a magma and an element)  35.4-4
  [10XCentralizer[110X, for groups with pcgs  45.16
  [2XCentralizerInGLnZ[102X  44.6-8
  [2XCentralizerModulo[102X  39.18-7
  [2XCentralizerSizeLimitConsiderFunction[102X  45.17-2
  [2XCentralNormalSeriesByPcgs[102X  45.11-8
  [2XCentre[102X  35.4-5
  [10XCentre[110X, for groups with pcgs  45.16
  centre, of a character  72.8-11
  [2XCentreOfCharacter[102X  72.8-11
  [2XCF[102X (for (subfield and) conductor)  60.1-1
  [2XCF[102X (for (subfield and) generators)  60.1-1
  [2XChangeStabChain[102X  43.11-3
  [2XCharacter[102X (for a character table and a list)  72.6-3
  [2XCharacter[102X (for a group and a list)  72.6-3
  character tables  71.3
  character tables, access to  71.3
  character tables, calculate  71.3
  character tables, infix operators  71.7
  character tables, of groups  71.3
  character value, of group element using powering operator  72.4
  [2XCharacterDegrees[102X (for a character table)  71.8-1
  [2XCharacterDegrees[102X (for a group)  71.8-1
  [2XCharacteristic[102X  31.10-1
  [2XCharacteristic[102X (for a class function)  72.4-1
  characteristic polynomial, for field elements  58.3-3
  [2XCharacteristicPolynomial[102X  24.13-1
  [2XCharacterNames[102X  71.9-6
  [2XCharacterParameters[102X  71.9-7
  characters  72.
  characters, permutation  72.13
  characters, symmetrizations of  72.11-1
  [2XCharacterTable[102X (for a group)  71.3-1
  [2XCharacterTable[102X (for a string)  71.3-1
  [2XCharacterTable[102X (for an ordinary character table)  71.3-1
  [2XCharacterTableDirectProduct[102X  71.20-1
  [2XCharacterTableFactorGroup[102X  71.20-3
  [2XCharacterTableIsoclinic[102X  71.20-4
  [2XCharacterTableRegular[102X  71.3-3
  [2XCharacterTableWithSortedCharacters[102X  71.21-1
  [2XCharacterTableWithSortedClasses[102X  71.21-3
  [2XCharacterTableWithStoredGroup[102X  71.6-4
  [2XCharacterTableWreathSymmetric[102X  71.20-5
  [2XCharInt[102X  27.8-2
  [2XCharsFamily[102X  27.4-6
  [2XCharSInt[102X  27.8-4
  [2XCheckDigitISBN[102X  14.6-1
  [2XCheckDigitISBN13[102X  14.6-1
  [2XCheckDigitPostalMoneyOrder[102X  14.6-1
  [2XCheckDigitTestFunction[102X  14.6-2
  [2XCheckDigitUPC[102X  14.6-1
  [2XCheckFixedPoints[102X  73.5-10
  [2XCheckForHandlingByNiceBasis[102X  61.12-3
  [2XCheckPermChar[102X  73.7-2
  [2XChevalleyBasis[102X  64.6-2
  [2XChiefNormalSeriesByPcgs[102X  45.11-16
  [2XChiefSeries[102X  39.17-1
  [2XChiefSeriesThrough[102X  39.17-2
  [2XChiefSeriesUnderAction[102X  39.17-3
  Chinese remainder  14.3-9
  [2XChineseRem[102X  14.3-9
  [2XChomp[102X  27.7-18
  [2XCite[102X  76.3-15
  [2XCIUnivPols[102X  66.1-5
  class function  72.1-1
  class function objects  72.1-1
  class functions  73.5
  class functions, as ring elements  72.4
  class multiplication coefficient  71.12-7
  class multiplication coefficient  71.12-8
  class multiplication coefficient  71.12-9
  [2XClassElementLattice[102X  39.20-2
  classes, real  71.9-11
  [2XClassesSolvableGroup[102X  45.17-1
  [2XClassFunction[102X (for a character table and a list)  72.6-1
  [2XClassFunction[102X (for a group and a list)  72.6-1
  [2XClassFunctionSameType[102X  72.6-4
  [2XClassMultiplicationCoefficient[102X (for character tables)  71.12-7
  [10XClassMultiplicationCoefficient[110X, for character tables  71.12-7
  [2XClassNames[102X  71.9-6
  [2XClassNamesTom[102X  70.7-5
  [2XClassOrbit[102X  71.9-12
  [2XClassParameters[102X  71.9-7
  [2XClassPermutation[102X  71.21-5
  [2XClassPositionsOfAgemo[102X  71.10-2
  [2XClassPositionsOfCenter[102X (for a character table)  71.10-3
  [2XClassPositionsOfCentre[102X (for a character table)  71.10-3
  [2XClassPositionsOfCentre[102X (for a character)  72.8-12
  [2XClassPositionsOfDerivedSubgroup[102X  71.10-5
  [2XClassPositionsOfDirectProductDecompositions[102X  71.10-4
  [2XClassPositionsOfElementaryAbelianSeries[102X  71.10-6
  [2XClassPositionsOfFittingSubgroup[102X  71.10-7
  [2XClassPositionsOfKernel[102X  72.8-10
  [2XClassPositionsOfLowerCentralSeries[102X  71.10-8
  [2XClassPositionsOfMaximalNormalSubgroups[102X  71.10-1
  [2XClassPositionsOfMinimalNormalSubgroups[102X  71.10-1
  [2XClassPositionsOfNormalClosure[102X  71.10-12
  [2XClassPositionsOfNormalSubgroup[102X  71.23-2
  [2XClassPositionsOfNormalSubgroups[102X  71.10-1
  [2XClassPositionsOfPCore[102X  71.10-11
  [2XClassPositionsOfSupersolvableResiduum[102X  71.10-10
  [2XClassPositionsOfUpperCentralSeries[102X  71.10-9
  [2XClassRoots[102X  71.9-13
  [2XClassStructureCharTable[102X  71.12-8
  [2XClassTypesTom[102X  70.7-4
  [2XCleanedTailPcElement[102X  45.5-11
  [2XClearCacheStats[102X  7.7-21
  [2XClearProfile[102X  7.7-10
  clone, an object  12.7
  [2XCloseMutableBasis[102X  61.8-6
  [2XCloseStream[102X  10.2-1
  [2XClosureGroup[102X  39.4-1
  [2XClosureGroupAddElm[102X  39.4-2
  [2XClosureGroupCompare[102X  39.4-2
  [2XClosureGroupDefault[102X  39.4-3
  [2XClosureGroupIntest[102X  39.4-2
  [2XClosureLeftModule[102X  57.2-3
  [2XClosureNearAdditiveGroup[102X (for a near-additive group and an element)  55.4-1
  [2XClosureNearAdditiveGroup[102X (for two near-additive groups)  55.4-1
  [2XClosureRing[102X (for a ring and a ring element)  56.1-8
  [2XClosureRing[102X (for two rings)  56.1-8
  [10XClosure[3XStruct[103X[10X[110X  31.3
  [2XClosureSubgroup[102X  39.4-4
  [2XClosureSubgroupNC[102X  39.4-4
  [2XCoboundaries[102X  64.12-7
  [2XCochain[102X  64.12-2
  [2XCochainSpace[102X  64.12-3
  cocycles  39.23
  [2XCocycles[102X (for Lie algebra module)  64.12-6
  [2XCodegreeOfPartialPerm[102X  54.3-2
  [2XCodegreeOfPartialPermCollection[102X  54.3-2
  [2XCodegreeOfPartialPermSemigroup[102X  54.7-2
  [2XCodePcGroup[102X  46.9-2
  [2XCodePcgs[102X  46.9-1
  coefficient, binomial  16.1-2
  [2XCoefficients[102X  61.6-3
  coefficients, for cyclotomics  18.1-10
  [2XCoefficientsAndMagmaElements[102X  65.2-4
  [2XCoefficientsFamily[102X  66.19-3
  [2XCoefficientsMultiadic[102X  14.3-8
  [2XCoefficientsOfLaurentPolynomial[102X  66.13-2
  [2XCoefficientsOfUnivariatePolynomial[102X  66.4-9
  [2XCoefficientsOfUnivariateRationalFunction[102X  66.4-7
  [2XCoefficientsQadic[102X  14.3-7
  [2XCoefficientsRing[102X  66.15-3
  [2XCoeffsCyc[102X  18.1-10
  [2XCoeffsMod[102X  23.4-4
  cohomology  39.23
  [2XCOHORTS_PRIMITIVE_GROUPS[102X  50.9-4
  [2XCoKernelOfAdditiveGeneralMapping[102X  32.10-6
  [2XCoKernelOfMultiplicativeGeneralMapping[102X  32.9-6
  [2XCollapsedMat[102X  73.5-16
  [2XCollected[102X  21.20-3
  [2XCollectionsFamily[102X  30.2-1
  [2XColorPrompt[102X  3.6-1
  [2XColumns[102X  51.9-9
  [2XCombinations[102X  16.2-1
  [2XCombinatorialCollector[102X  46.4-2
  [2XComm[102X  31.12-3
  [10XComm[110X, for words  37.4
  comments  4.4
  [2XCommutativeDiagram[102X  73.5-9
  [2XCommutatorFactorGroup[102X  39.18-3
  [2XCommutatorLength[102X  39.12-4
  [2XCommutatorLength[102X (for a character table)  71.8-5
  [2XCommutatorSubgroup[102X  39.12-2
  [2XCompacted[102X  21.20-2
  [2XCompanionMat[102X  24.13-5
  [2XCompareVersionNumbers[102X  76.3-6
  comparison, fp semigroup elements  52.3-1
  comparison, operation  31.11-1
  comparison, rational functions  66.3
  comparisons, of booleans  20.3
  comparisons, of lists  21.10
  [2XCompatibleConjugacyClasses[102X  71.6-5
  [2XCompatiblePairs[102X  46.8-8
  [2XComplementClassesRepresentatives[102X  39.11-6
  [2XComplementClassesRepresentativesEA[102X  39.23-4
  [2XComplementIntMat[102X  25.1-6
  [2XComplementSystem[102X  39.13-5
  [2XComplexConjugate[102X  18.5-2
  [2XComplexConjugate[102X (for a class function)  72.4-2
  [2XComplexI[102X  19.2-1
  [2XComplexificationQuat[102X (for a matrix)  62.5-2
  [2XComplexificationQuat[102X (for a vector)  62.5-2
  [2XComponentPartialPermInt[102X  54.5-3
  [2XComponentRepsOfPartialPerm[102X  54.3-20
  [2XComponentRepsOfTransformation[102X  53.5-19
  [2XComponentsOfPartialPerm[102X  54.3-18
  [2XComponentsOfTransformation[102X  53.5-17
  [2XComponentTransformationInt[102X  53.4-3
  [2XCompositionMapping[102X  32.2-4
  [10XCompositionMapping[110X, for Frobenius automorphisms  59.4-1
  [2XCompositionMapping2[102X  32.2-5
  [2XCompositionMapping2General[102X  32.2-5
  [2XCompositionMaps[102X  73.5-1
  [2XCompositionOfStraightLinePrograms[102X  37.8-7
  [2XCompositionSeries[102X  39.17-5
  [10XCompositionSeries[110X, for groups with pcgs  45.16
  [2XComputedBrauerTables[102X  71.3-2
  [2XComputedClassFusions[102X  73.3-2
  [2XComputedIndicators[102X  71.12-5
  [2XComputedIsPSolubleCharacterTables[102X  71.12-3
  [2XComputedIsPSolvableCharacterTables[102X  71.12-3
  [2XComputedPowerMaps[102X  73.1-1
  [2XComputedPrimeBlockss[102X  71.11-1
  [2XConcatenation[102X (for a list of lists)  21.20-1
  [2XConcatenation[102X (for several lists)  21.20-1
  concatenation, of lists  21.20
  [2XConductor[102X (for a collection of cyclotomics)  18.1-7
  [2XConductor[102X (for a cyclotomic)  18.1-7
  [2XConfluentRws[102X  38.1-6
  [2XCongruences[102X (for character tables)  73.6-2
  [2XConjugacyClass[102X  39.10-1
  [2XConjugacyClasses[102X (attribute)  39.10-2
  [2XConjugacyClasses[102X (for character tables)  71.6-2
  [10XConjugacyClasses[110X, for groups with pcgs  45.16
  [10XConjugacyClasses[110X, for linear groups  50.3
  [2XConjugacyClassesByOrbits[102X  39.10-4
  [2XConjugacyClassesByRandomSearch[102X  39.10-3
  [2XConjugacyClassesMaximalSubgroups[102X  39.19-4
  [2XConjugacyClassesPerfectSubgroups[102X  39.20-7
  [2XConjugacyClassesSubgroups[102X  39.19-3
  [2XConjugacyClassSubgroups[102X  39.19-1
  conjugate, matrix  24.3
  conjugate, of a word  37.4
  [2XConjugateDominantWeight[102X  64.7-6
  [2XConjugateDominantWeightWithWord[102X  64.7-6
  [2XConjugateGroup[102X  39.2-6
  [2XConjugates[102X  58.3-6
  [2XConjugateSubgroup[102X  39.3-8
  [2XConjugateSubgroups[102X  39.3-9
  conjugation  41.2-1
  [2XConjugatorAutomorphism[102X  40.6-2
  [2XConjugatorAutomorphismNC[102X  40.6-2
  [2XConjugatorIsomorphism[102X  40.6-1
  [2XConjugatorOfConjugatorIsomorphism[102X  40.6-5
  [2XConsiderKernels[102X  73.6-3
  [2XConsiderSmallerPowerMaps[102X  73.6-4
  [2XConsiderStructureConstants[102X  73.3-7
  [2XConsiderTableAutomorphisms[102X  73.7-3
  [2XConstantTimeAccessList[102X  21.17-6
  [2XConstantTransformation[102X  53.2-9
  constituent, of a group character  72.8-5
  [2XConstituentsCompositionMapping[102X  32.2-7
  [2XConstituentsOfCharacter[102X  72.8-8
  [2XContainedCharacters[102X  73.5-17
  [2XContainedDecomposables[102X  73.5-17
  [2XContainedMaps[102X  73.5-6
  [2XContainedPossibleCharacters[102X  73.5-15
  [2XContainedPossibleVirtualCharacters[102X  73.5-15
  [2XContainedSpecialVectors[102X  73.5-15
  [2XContainedTom[102X  70.9-5
  [2XContainingTom[102X  70.9-6
  [9Xcontinue[109X statement  4.22
  [2XContinuedFractionApproximationOfRoot[102X  15.6-2
  [2XContinuedFractionExpansionOfRoot[102X  15.6-1
  convert, to a string  27.4
  [2XConvertToBlistRep[102X  22.5-1
  [2XConvertToCharacterTable[102X  71.3-5
  [2XConvertToCharacterTableNC[102X  71.3-5
  [2XConvertToMatrixRep[102X (for a list (and a field))  24.14-2
  [2XConvertToMatrixRep[102X (for a list (and a prime power))  24.14-2
  [2XConvertToMatrixRepNC[102X (for a list (and a field))  24.14-2
  [2XConvertToMatrixRepNC[102X (for a list (and a prime power))  24.14-2
  [2XConvertToRangeRep[102X  21.22-2
  [2XConvertToStringRep[102X  27.4-2
  [2XConvertToTableOfMarks[102X  70.6-5
  [2XConvertToVectorRep[102X (for a list (and a field))  23.3-1
  [2XConvertToVectorRep[102X (for a list (and a prime power))  23.3-1
  [2XConvertToVectorRepNC[102X (for a list (and a field))  23.3-1
  [2XConvertToVectorRepNC[102X (for a list (and a prime power))  23.3-1
  [2XConwayPolynomial[102X  59.5-1
  coprime  4.13
  Copy  12.7
  copy, an object  12.7
  [2XCopyListEntries[102X  21.4-4
  [2XCopyOptionsDefaults[102X  43.11-2
  [2XCopyStabChain[102X  43.11-1
  [2XCopyToStringRep[102X  27.4-3
  [2XCore[102X  39.11-2
  [2XCorrespondingGeneratorsByModuloPcgs[102X  45.9-6
  [2XCos[102X  19.2-1
  coset  39.7
  [2XCosetDecomposition[102X  39.7-5
  [2XCosetLeadersMatFFE[102X  23.6-6
  [2XCosetTable[102X  47.6-1
  [2XCosetTableBySubgroup[102X  47.6-4
  [2XCosetTableDefaultLimit[102X  47.6-7
  [2XCosetTableDefaultMaxLimit[102X  47.6-6
  [2XCosetTableFromGensAndRels[102X  47.6-5
  [2XCosetTableInWholeGroup[102X  47.8-1
  [2XCosetTableOfFpSemigroup[102X  52.7-1
  [2XCosetTableStandard[102X  47.7-1
  [2XCosh[102X  19.2-1
  [2XCot[102X  19.2-1
  [2XCoth[102X  19.2-1
  [2XCoverageLineByLine[102X  7.7-15
  [2XCrcFile[102X  9.7-7
  [2XCrcString[102X  27.9-4
  [2XCrystGroupDefaultAction[102X  44.7-1
  [2XCsc[102X  19.2-1
  [2XCsch[102X  19.2-1
  [2XCuberoot[102X  19.2-1
  [2XCycle[102X  41.9-3
  [2XCycleIndex[102X (for a permutation and an action domain)  41.9-7
  [2XCycleIndex[102X (for a permutation group and an action domain)  41.9-7
  [2XCycleLength[102X  41.9-4
  [2XCycleLengths[102X  41.9-6
  [2XCycles[102X  41.9-5
  [2XCyclesOfTransformation[102X  53.5-20
  [2XCycleStructureClass[102X  72.8-14
  [2XCycleStructurePerm[102X  42.4-2
  [2XCycleTransformationInt[102X  53.5-21
  [2XCyclicExtensionsTom[102X (for a list of primes)  70.9-7
  [2XCyclicExtensionsTom[102X (for a prime)  70.9-7
  [2XCyclicGroup[102X  50.1-2
  cyclotomic field elements  18.
  cyclotomic fields, CanonicalBasis  60.3
  [2XCyclotomicField[102X (for (subfield and) conductor)  60.1-1
  [2XCyclotomicField[102X (for (subfield and) generators)  60.1-1
  [2XCyclotomicPolynomial[102X  66.9-1
  [2XCyclotomics[102X  18.1-2
  [10XCyclotomicsFamily[110X  18.1-3
  [22Xd_N[122X (irrational value)  18.4-1
  Darstellungsgruppe, see EpimorphismSchurCover  39.24
  data type, unknown  74.
  [2XDataType[102X  13.9-2
  [2XDayDMY[102X  27.10-4
  [2XDaysInMonth[102X  27.10-2
  [2XDaysInYear[102X  27.10-1
  DEC  25.4
  [2XDeclareAttribute[102X  79.18-3
  [10XDeclareAttribute[110X, example  80.5
  [10XDeclareAttribute!example[110X  80.8-3
  [10XDeclareAutoPackage[110X  77.2
  [2XDeclareAutoreadableVariables[102X  76.3-8
  [2XDeclareCategory[102X  79.18-1
  [2XDeclareFilter[102X  79.18-5
  [2XDeclareGlobalFunction[102X  79.18-7
  [2XDeclareGlobalVariable[102X  79.18-8
  [2XDeclareHandlingByNiceBasis[102X  61.12-1
  [2XDeclareInfoClass[102X  7.4-2
  [2XDeclareOperation[102X  79.18-6
  [10XDeclarePackage[110X  77.2
  [10XDeclarePackageAutoDocumentation[110X  77.2
  [10XDeclarePackageDocumentation[110X  77.2
  [2XDeclareProperty[102X  79.18-4
  [2XDeclareRepresentation[102X  79.18-2
  [10XDeclareRepresentation[110X, belongs to implementation part  79.19
  [10XDeclareRepresentation[110X, example  80.6
  [2XDeclareSynonym[102X  79.18-10
  [2XDeclareSynonymAttr[102X  79.18-10
  [2XDeclareUserPreference[102X  3.2-4
  [2XDecodeTree[102X  48.10-1
  decompose, a group character  72.8-5
  [2XDecomposedFixedPointVector[102X  70.9-8
  [2XDecomposeTensorProduct[102X  64.13-3
  [2XDecomposition[102X  25.4-1
  decomposition matrix  25.4
  [2XDecompositionInt[102X  25.4-5
  [2XDecompositionMatrix[102X  71.11-4
  [2XDecreased[102X  72.10-7
  [2XDEFAULTDISPLAYSTRING[102X  27.7-2
  [2XDefaultField[102X (for cyclotomics)  18.1-16
  [2XDefaultField[102X (for a list of generators)  58.1-4
  [2XDefaultField[102X (for several generators)  58.1-4
  [2XDefaultField[102X (for finite field elements)  59.3-1
  [2XDefaultFieldByGenerators[102X  58.1-5
  [2XDefaultFieldOfMatrix[102X  24.4-2
  [2XDefaultFieldOfMatrixGroup[102X  44.2-2
  [10XDefaultInfoHandler[110X  7.4-6
  [2XDefaultRing[102X (for a collection)  56.1-3
  [2XDefaultRing[102X (for ring elements)  56.1-3
  [2XDefaultRing[102X (for finite field elements)  59.3-1
  [2XDefaultRingByGenerators[102X  56.1-5
  [2XDefaultStabChainOptions[102X  43.8-3
  [2XDEFAULTVIEWSTRING[102X  27.7-4
  [2XDefiningPolynomial[102X  58.2-7
  [2XDefiningQuotientHomomorphism[102X  47.13-4
  [2XDegreeFFE[102X (for a FFE)  59.2-1
  [2XDegreeFFE[102X (for a matrix of FFEs)  59.2-1
  [2XDegreeFFE[102X (for a vector of FFEs)  59.2-1
  [2XDegreeIndeterminate[102X  66.6-1
  [2XDegreeOfBinaryRelation[102X  33.2-10
  [2XDegreeOfCharacter[102X  72.8-4
  [2XDegreeOfLaurentPolynomial[102X  66.5-3
  [2XDegreeOfPartialPerm[102X  54.3-1
  [2XDegreeOfPartialPermCollection[102X  54.3-1
  [2XDegreeOfPartialPermSemigroup[102X  54.7-2
  [2XDegreeOfTransformation[102X  53.5-1
  [2XDegreeOfTransformationCollection[102X  53.5-1
  [2XDegreeOfTransformationSemigroup[102X  53.7-2
  [2XDegreeOverPrimeField[102X  58.2-6
  [2XDelta[102X  75.2-2
  denominator, of a rational  17.2-5
  [2XDenominatorCyc[102X  18.1-11
  [2XDenominatorOfModuloPcgs[102X  45.9-4
  [2XDenominatorOfRationalFunction[102X  66.4-3
  [2XDenominatorRat[102X  17.2-5
  [2XDenseHashTable[102X  28.6-1
  [2XDenseIntKey[102X  28.5-1
  deprecated  77.
  [2XDepthOfPcElement[102X  45.5-4
  [2XDepthOfUpperTriangularMatrix[102X  24.12-3
  [2XDerangements[102X  16.2-14
  [2XDerivations[102X  64.2-6
  [2XDerivative[102X  66.6-5
  [2XDerivedLength[102X  39.17-8
  [2XDerivedSeriesOfGroup[102X  39.17-7
  [2XDerivedSubgroup[102X  39.12-3
  [2XDerivedSubgroupsTom[102X  70.9-2
  [2XDerivedSubgroupsTomPossible[102X  70.9-3
  [2XDerivedSubgroupsTomUnique[102X  70.9-3
  [2XDerivedSubgroupTom[102X  70.9-2
  [2XDescriptionOfRootOfUnity[102X  18.1-13
  [2XDeterminant[102X  24.4-4
  determinant, integer matrix  25.3-1
  determinant character  72.8-18
  [2XDeterminantIntMat[102X  25.3-1
  [2XDeterminantMat[102X  24.4-4
  [2XDeterminantMatDestructive[102X  24.4-5
  [2XDeterminantMatDivFree[102X  24.4-6
  [2XDeterminantOfCharacter[102X  72.8-18
  [2XDiagonalizeIntMat[102X  25.2-8
  [2XDiagonalizeMat[102X  24.9-3
  [2XDiagonalMat[102X  24.5-4
  [2XDiagonalOfMat[102X  24.12-1
  [2XDictionaryByPosition[102X  28.3-1
  [2XDicyclicGroup[102X  50.1-7
  [2XDifference[102X  30.5-4
  [2XDifferenceBlist[102X  22.3-3
  [2XDihedralGroup[102X  50.1-6
  [2XDimension[102X  57.3-3
  [2XDimensionOfHighestWeightModule[102X  64.13-4
  [2XDimensionOfMatrixGroup[102X  44.2-1
  [2XDimensionOfVectors[102X  61.9-6
  [2XDimensionsLoewyFactors[102X  39.17-15
  [2XDimensionsMat[102X  24.4-1
  [2XDirectoriesLibrary[102X  9.3-5
  [2XDirectoriesPackageLibrary[102X  76.3-4
  [2XDirectoriesPackagePrograms[102X  76.3-5
  [2XDirectoriesSystemPrograms[102X  9.3-6
  [2XDirectory[102X  9.3-2
  [2XDirectoryContents[102X  9.3-7
  [2XDirectoryCurrent[102X  9.3-4
  [2XDirectoryDesktop[102X  9.3-8
  [2XDirectoryHome[102X  9.3-9
  [2XDirectoryTemporary[102X  9.3-3
  [2XDirectProduct[102X  49.1-1
  [2XDirectProductOp[102X  49.1-1
  [2XDirectSum[102X  56.9-5
  [2XDirectSumDecomposition[102X (for Lie algebras)  62.9-18
  [2XDirectSumOfAlgebraModules[102X (for a list of Lie algebra modules)  62.11-23
  [2XDirectSumOfAlgebraModules[102X (for two Lie algebra modules)  62.11-23
  [2XDirectSumOfAlgebras[102X (for a list of algebras)  62.9-14
  [2XDirectSumOfAlgebras[102X (for two algebras)  62.9-14
  [2XDirectSumOp[102X  56.9-5
  disable automatic loading  76.2
  [2XDisableAttributeValueStoring[102X  13.6-5
  [2XDiscriminant[102X  66.6-6
  [2XDisplay[102X (for a ffe)  59.6-1
  [2XDisplay[102X  6.3-6
  [2XDisplay[102X (for a table of marks)  70.4-3
  [2XDisplay[102X (for a character table)  71.13-3
  [2XDisplay[102X (for class functions)  72.5-3
  [2XDisplayCacheStats[102X  7.7-20
  [2XDisplayCompositionSeries[102X  39.17-6
  [2XDisplayEggBoxOfDClass[102X  51.8-7
  [2XDisplayImfInvariants[102X  50.12-2
  [2XDisplayInformationPerfectGroups[102X (for a pair [ order, index ])  50.8-7
  [2XDisplayInformationPerfectGroups[102X (for group order (and index))  50.8-7
  [2XDisplayOptions[102X  71.13-4
  [2XDisplayOptionsStack[102X  8.1-6
  [2XDisplayPackageLoadingLog[102X  76.2-4
  [2XDisplayProfile[102X  7.7-9
  [2XDisplayString[102X  27.7-1
  [2XDistancePerms[102X  42.2-2
  [2XDistancesDistributionMatFFEVecFFE[102X  23.6-4
  [2XDistancesDistributionVecFFEsVecFFE[102X  23.6-3
  [2XDistanceVecFFE[102X  23.6-2
  division  4.13
  division, operation  31.12-1
  division rings  58.
  [2XDivisionRingByGenerators[102X  58.1-8
  divisors, of an integer  14.4-12
  [2XDivisorsInt[102X  14.4-12
  Dixon-Schneider algorithm  71.16
  [2XDixonInit[102X  71.17-2
  [2XDixonRecord[102X  71.17-1
  [2XDixonSplit[102X  71.17-4
  [2XDixontinI[102X  71.17-3
  [2XDMYDay[102X  27.10-3
  [2XDMYhmsSeconds[102X  27.10-11
  [2XDnLattice[102X  72.10-8
  [2XDnLatticeIterative[102X  72.10-9
  [9Xdo[109X  4.20
  document formats (text, dvi, ps, pdf, HTML)  2.3
  document formats!for help books  84.3
  [2XDomain[102X  31.9-3
  [2XDomainByGenerators[102X  31.9-3
  [2XDomainOfPartialPerm[102X  54.3-4
  [2XDomainOfPartialPermCollection[102X  54.3-4
  [2XDominantCharacter[102X (for a root system and a highest weight)  64.13-2
  [2XDominantCharacter[102X (for a semisimple Lie algebra and a highest weight)  64.13-2
  [2XDominantWeights[102X  64.13-1
  dot-file  39.20-3
  [2XDotFileLatticeSubgroups[102X  39.20-3
  [2XDoubleCoset[102X  39.9-1
  [2XDoubleCosetRepsAndSizes[102X  39.9-5
  [2XDoubleCosets[102X  39.9-3
  [2XDoubleCosetsNC[102X  39.9-3
  [2XDoubleCoverOfAlternatingGroup[102X  39.24-11
  [2XDoubleHashArraySize[102X  28.7-2
  doublequote character  27.2
  doublequotes  27.1
  [2XDownEnv[102X  6.5-1
  duplicate free  21.17-2
  [2XDuplicateFreeList[102X  21.20-4
  [2XDxIncludeIrreducibles[102X  71.17-6
  [2XE[102X  18.1-1
  [22Xe_N[122X (irrational value)  18.4-1
  [2XEANormalSeriesByPcgs[102X  45.11-4
  [2XEarns[102X (for a group, an action domain, etc.)  41.10-6
  [2XEarns[102X (for an external set)  41.10-6
  [2XEB[102X  18.4-1
  [2XEC[102X  18.4-1
  [2XED[102X  18.4-1
  [2XEdit[102X  6.10-1
  [2XEE[102X  18.4-1
  [2XEF[102X  18.4-1
  [2XEG[102X  18.4-1
  [2XEggBoxOfDClass[102X  51.8-6
  [2XEH[102X  18.4-1
  [2XEI[102X  18.4-2
  [2XEigenspaces[102X  24.8-4
  [2XEigenvalues[102X  24.8-3
  [2XEigenvaluesChar[102X  72.8-19
  [2XEigenvectors[102X  24.8-5
  [2XEJ[102X  18.4-4
  [2XEK[102X  18.4-4
  [2XEL[102X  18.4-4
  element test, for lists  21.8-1
  [2XElementaryAbelianGroup[102X  50.1-4
  [2XElementaryAbelianSeries[102X (for a group)  39.17-9
  [2XElementaryAbelianSeries[102X (for a list)  39.17-9
  [2XElementaryAbelianSeriesLargeSteps[102X  39.17-9
  [2XElementaryDivisorsMat[102X  24.9-1
  [2XElementaryDivisorsMatDestructive[102X  24.9-1
  [2XElementaryDivisorsTransformationsMat[102X  24.9-2
  [2XElementaryDivisorsTransformationsMatDestructive[102X  24.9-2
  [2XElementOfFpGroup[102X  47.4-5
  [2XElementOfFpSemigroup[102X  52.4-2
  [2XElementOfMagmaRing[102X  65.2-6
  [2XElementOrdersPowerMap[102X  73.1-3
  [2XElementProperty[102X  43.12-2
  [2XElements[102X  30.3-11
  elements, definition  12.2
  elements, of a list or collection  30.3-10
  [2XElementsFamily[102X  30.2-3
  [2XElementsStabChain[102X  43.10-9
  [9Xelif[109X  4.17
  [2XEliminatedWord[102X  37.4-6
  [2XEliminationOrdering[102X  66.17-10
  ElmWPObj  86.2
  [2XElmWPObj[102X  86.2-1
  [9Xelse[109X  4.17
  [2XEM[102X  18.4-4
  [10Xemacs[110X  6.11
  email addresses  1.5
  [2XEmbedding[102X (for a domain and a positive integer)  32.2-10
  [2XEmbedding[102X (for two domains)  32.2-10
  [2XEmbedding[102X (for group products)  49.6-1
  [10XEmbedding[110X, example for direct products  49.1-1
  [10XEmbedding[110X, example for semidirect products  49.2-1
  [10XEmbedding[110X, example for wreath products  49.4-1
  [10XEmbedding[110X, for Lie algebras  64.1-3
  [10XEmbedding[110X, for magma rings  65.3
  embeddings, find all  40.9-5
  [2XEmptyBinaryRelation[102X (for a degree)  33.1-4
  [2XEmptyBinaryRelation[102X (for a domain)  33.1-4
  [2XEmptyMatrix[102X  24.5-3
  [2XEmptyPartialPerm[102X  54.2-6
  [2XEmptyPlist[102X  21.9-1
  [2XEmptySCTable[102X  62.4-3
  [2XEmptyStabChain[102X  43.11-7
  [2XEmptyString[102X  27.4-5
  [2XEnableAttributeValueStoring[102X  13.6-6
  [9Xend[109X  4.23
  [2XEnd[102X  61.10-6
  [2XEndlineFunc[102X  5.1-5
  [2XEndsWith[102X  27.7-19
  [2XEnumerator[102X  30.3-2
  [2XEnumeratorByBasis[102X  61.6-5
  [2XEnumeratorByFunctions[102X (for a domain and a record)  30.3-4
  [2XEnumeratorByFunctions[102X (for a family and a record)  30.3-4
  [2XEnumeratorOfCombinations[102X  16.2-2
  [2XEnumeratorOfTuples[102X  16.2-9
  [2XEnumeratorSorted[102X  30.3-3
  environment  4.23
  [2XEpicentre[102X  39.24-4
  [2XEpimorphismFromFreeGroup[102X  39.5-1
  [2XEpimorphismNilpotentQuotient[102X  47.14-4
  [2XEpimorphismNonabelianExteriorSquare[102X  39.24-6
  [2XEpimorphismPGroup[102X  47.14-3
  [2XEpimorphismQuotientSystem[102X  47.14-2
  epimorphisms, find all  40.9-4
  [2XEpimorphismSchurCover[102X  39.24-1
  [2XEpimorphismSolvableQuotient[102X  47.14-6
  [2XEqFloat[102X  19.2-2
  equality, associative words  37.3-1
  equality, elements of finitely presented groups  47.3-1
  equality, for pcwords  46.2-1
  equality, for transformations  53.4
  equality, nonassociative words  36.2-1
  equality, of booleans  20.3-1
  equality, of records  29.5
  equality, operation  31.11-1
  equality test  4.12
  equality test, for permutations  42.2-1
  equivalence class  33.7-1
  equivalence relation  33.2-8
  equivalence relation  33.5
  [2XEquivalenceClasses[102X (attribute)  33.7-3
  [2XEquivalenceClassOfElement[102X  33.7-4
  [2XEquivalenceClassOfElementNC[102X  33.7-4
  [2XEquivalenceClassRelation[102X  33.7-2
  [2XEquivalenceRelationByPairs[102X  33.5-3
  [2XEquivalenceRelationByPairsNC[102X  33.5-3
  [2XEquivalenceRelationByPartition[102X  33.5-1
  [2XEquivalenceRelationByPartitionNC[102X  33.5-1
  [2XEquivalenceRelationByProperty[102X  33.5-4
  [2XEquivalenceRelationByRelation[102X  33.5-2
  [2XEquivalenceRelationPartition[102X  33.6-1
  [2XER[102X  18.4-2
  [2XErf[102X  19.2-1
  [2XError[102X  6.6-1
  [2XErrorCount[102X  6.6-3
  [2XErrorMayQuit[102X  6.6-2
  [10XErrorNoTraceBack[110X  6.4-3
  errors, syntax  6.1
  [2XES[102X  18.4-3
  escaped characters  27.2
  escaping non-special characters  27.2
  [2XET[102X  18.4-3
  [2XEU[102X  18.4-3
  [2XEuclideanDegree[102X  56.6-2
  [2XEuclideanQuotient[102X  56.6-3
  [2XEuclideanRemainder[102X  56.6-4
  Euler's totient function  15.2-2
  [2XEulerianFunction[102X  39.16-3
  [2XEulerianFunctionByTom[102X  70.9-9
  [2XEV[102X  18.4-3
  [2XEvalStraightLineProgElm[102X  37.9-4
  [2XEvalString[102X  27.9-3
  evaluation  4.7
  evaluation, strings  27.9-1
  [2XEW[102X  18.4-3
  [2XEX[102X  18.4-3
  [2XExactSizeConsiderFunction[102X  39.21-5
  Excel  10.11
  [2XExec[102X  11.1-2
  execution  4.14
  exit  6.7
  [2XExp[102X  19.2-1
  [2XExp10[102X  19.2-1
  [2XExp2[102X  19.2-1
  Expanded form of monomials  66.21
  [2XExpm1[102X  19.2-1
  [2XExponent[102X  39.16-2
  [2XExponent[102X (for a character table)  71.8-5
  exponent, of the prime residue group  15.2-3
  exponentiation, operation  31.12-1
  [2XExponentOfPcElement[102X  45.5-2
  [2XExponentsConjugateLayer[102X  45.6-1
  [2XExponentsOfCommutator[102X  45.6-4
  [2XExponentsOfConjugate[102X  45.6-3
  [2XExponentsOfPcElement[102X  45.5-3
  [2XExponentsOfRelativePower[102X  45.6-2
  [2XExponentSumWord[102X  37.4-2
  [2XExponentSyllable[102X  37.5-2
  [2XExtendedPcgs[102X  45.7-8
  [2XExtendRootDirectories[102X  76.2-3
  [2XExtendStabChain[102X  43.11-4
  [2XExtension[102X  46.8-5
  [2XExtensionNC[102X  46.8-5
  [2XExtensionRepresentatives[102X  46.8-9
  [2XExtensions[102X  46.8-4
  exterior power  72.11-3
  [2XExteriorCentre[102X  39.24-4
  [2XExteriorPowerOfAlgebraModule[102X  64.15-2
  External representation of polynomials  66.21
  [2XExternalOrbit[102X  41.12-9
  [2XExternalOrbits[102X (for a group, an action domain, etc.)  41.12-11
  [2XExternalOrbits[102X (for an external set)  41.12-11
  [2XExternalOrbitsStabilizers[102X (for a group, an action domain, etc.)  41.12-12
  [2XExternalOrbitsStabilizers[102X (for an external set)  41.12-12
  [2XExternalSet[102X  41.12-2
  [10XExternalSet[110X, computing orbits  85.3
  [2XExternalSubset[102X  41.12-7
  [2XExtract[102X  72.10-5
  [2XExtraspecialGroup[102X  50.1-8
  [2XExtRepDenominatorRatFun[102X  66.21-3
  [2XExtRepNumeratorRatFun[102X  66.21-2
  [2XExtRepOfObj[102X (for a cyclotomic)  18.1-12
  [2XExtRepOfObj[102X  79.16-1
  [2XExtRepPolynomialRatFun[102X  66.21-6
  [2XEY[102X  18.4-3
  [22Xf_N[122X (irrational value)  18.4-1
  [2XFactorCosetAction[102X  41.8-1
  [2XFactorCosetAction[102X (for fp groups)  47.6-3
  [2XFactorFreeSemigroupByRelations[102X  52.2-2
  [2XFactorGroup[102X  39.18-2
  [2XFactorGroupFpGroupByRels[102X  47.2-2
  [2XFactorGroupNC[102X  39.18-2
  [2XFactorGroupNormalSubgroupClasses[102X  71.23-4
  [2XFactorGroupTom[102X  70.9-11
  [2XFactorial[102X  16.1-1
  factorization  39.5
  [2XFactorization[102X  39.5-2
  [2XFactors[102X  56.5-9
  [2XFactors[102X (for polynomials over abelian number fields)  60.2-1
  [2XFactors[102X (of polynomial)  66.10-1
  [2XFactorsInt[102X  14.4-7
  [2XFactorsInt[102X (using Pollard's Rho)  14.4-7
  [2XFactorsOfDirectProduct[102X  71.20-2
  [2XFactorsSquarefree[102X  66.10-2
  [2Xfail[102X  20.2-1
  [2XFaithfulModule[102X (for Lie algebras)  62.11-20
  [2XFamiliesOfGeneralMappingsAndRanges[102X  32.14-5
  [2XFamiliesOfRows[102X  71.22-5
  [2XFamilyForOrdering[102X  34.3-4
  [2XFamilyObj[102X  13.1-1
  [2XFamilyPcgs[102X  46.1-1
  [2XFamilyRange[102X  32.14-3
  [2XFamilySource[102X  32.14-4
  features, under UNIX  3.1
  [9Xfi[109X  4.17
  [2XFibonacci[102X  16.3-1
  [2XField[102X (for (a field and) a list of generators)  58.1-3
  [2XField[102X (for several generators)  58.1-3
  field homomorphisms, Frobenius  59.4-1
  [2XFieldByGenerators[102X  58.1-8
  [2XFieldExtension[102X  58.2-9
  [2XFieldOfMatrixGroup[102X  44.2-3
  [2XFieldOverItselfByGenerators[102X  58.2-2
  fields  58.
  [2XFileDescriptorOfStream[102X  10.2-2
  [2XFilename[102X (for a directory and a string)  9.4-1
  [2XFilename[102X (for a list of directories and a string)  9.4-1
  [2XFilenameFunc[102X  5.1-4
  [2XFiltered[102X  21.20-20
  [2XFindSl2[102X  64.9-7
  finiteness test, for a list or collection  30.4-2
  [2XFirst[102X  21.20-22
  [2XFittingSubgroup[102X  39.12-5
  [2XFixedPointsOfPartialPerm[102X (for a partial perm coll)  54.3-8
  [2XFixedPointsOfPartialPerm[102X (for a partial perm)  54.3-8
  [2XFlat[102X  21.20-6
  [2XFlatKernelOfTransformation[102X  53.5-11
  [2XFLOAT[102X (constants)  19.2-6
  [2XFloat[102X  19.2-7
  [2XFloor[102X  19.2-1
  flush character  27.2
  [2XFlushCaches[102X  79.18-11
  FOA triples  85.
  [9Xfor[109X loop  4.20
  [2XForAll[102X  21.20-23
  [2XForAny[102X  21.20-24
  [2XFORCE_QUIT_GAP[102X  6.7-4
  [2XFpElmComparisonMethod[102X  47.3-3
  [2XFpGroupPresentation[102X  48.1-4
  [2XFpGrpMonSmgOfFpGrpMonSmgElement[102X  52.1-7
  [2XFpLieAlgebraByCartanMatrix[102X  64.11-1
  [2XFrac[102X  19.2-1
  Frame  72.11-4
  [2XFrattiniSubgroup[102X  39.12-6
  [10XFrattiniSubgroup[110X, for groups with pcgs  45.16
  [2XFreeAbelianGroup[102X  50.1-5
  [2XFreeAlgebra[102X (for ring and several names)  62.3-1
  [2XFreeAlgebra[102X (for ring, rank (and name))  62.3-1
  [2XFreeAlgebraWithOne[102X (for ring and several names)  62.3-2
  [2XFreeAlgebraWithOne[102X (for ring, rank (and name))  62.3-2
  [2XFreeAssociativeAlgebra[102X (for ring and several names)  62.3-3
  [2XFreeAssociativeAlgebra[102X (for ring, rank (and name))  62.3-3
  [2XFreeAssociativeAlgebraWithOne[102X (for ring and several names)  62.3-4
  [2XFreeAssociativeAlgebraWithOne[102X (for ring, rank (and name))  62.3-4
  [2XFreeGeneratorsOfFpGroup[102X  47.4-2
  [2XFreeGeneratorsOfFpSemigroup[102X  52.4-4
  [2XFreeGeneratorsOfWholeGroup[102X  47.4-2
  [2XFreeGroup[102X (for a list of names)  37.2-1
  [2XFreeGroup[102X (for given rank)  37.2-1
  [2XFreeGroup[102X (for infinitely many generators)  37.2-1
  [2XFreeGroup[102X (for various names)  37.2-1
  [2XFreeGroupOfFpGroup[102X  47.4-1
  [2XFreeLeftModule[102X  57.3-2
  [2XFreeLieAlgebra[102X (for ring and several names)  64.2-4
  [2XFreeLieAlgebra[102X (for ring, rank (and name))  64.2-4
  [2XFreeMagma[102X (for a list of names)  36.4-1
  [2XFreeMagma[102X (for given rank)  36.4-1
  [2XFreeMagma[102X (for infinitely many generators)  36.4-1
  [2XFreeMagma[102X (for various names)  36.4-1
  [2XFreeMagmaRing[102X  65.1-1
  [2XFreeMagmaWithOne[102X (for a list of names)  36.4-2
  [2XFreeMagmaWithOne[102X (for given rank)  36.4-2
  [2XFreeMagmaWithOne[102X (for infinitely many generators)  36.4-2
  [2XFreeMagmaWithOne[102X (for various names)  36.4-2
  [2XFreeMonoid[102X (for a list of names)  51.2-9
  [2XFreeMonoid[102X (for given rank)  51.2-9
  [2XFreeMonoid[102X (for infinitely many generators)  51.2-9
  [2XFreeMonoid[102X (for various names)  51.2-9
  [2XFreeMonoidOfRewritingSystem[102X  52.6-7
  [2XFreeProduct[102X (for a list)  49.5-1
  [2XFreeProduct[102X (for several groups)  49.5-1
  [2XFreeSemigroup[102X (for a list of names)  51.1-10
  [2XFreeSemigroup[102X (for given rank)  51.1-10
  [2XFreeSemigroup[102X (for infinitely many generators)  51.1-10
  [2XFreeSemigroup[102X (for various names)  51.1-10
  [2XFreeSemigroupOfFpSemigroup[102X  52.4-3
  [2XFreeSemigroupOfRewritingSystem[102X  52.6-6
  Frobenius automorphism  59.4-1
  [2XFrobeniusAutomorphism[102X  59.4-1
  [2XFrobeniusCharacterValue[102X  72.15-1
  [2XFullMatrixAlgebra[102X  62.5-4
  [2XFullMatrixAlgebraCentralizer[102X  62.9-15
  [2XFullMatrixLieAlgebra[102X  64.2-5
  [2XFullMatrixModule[102X  57.3-11
  [2XFullMatrixSpace[102X  61.9-5
  [2XFullRowModule[102X  57.3-9
  [2XFullRowSpace[102X  61.9-4
  [2XFullTransformationMonoid[102X  53.7-3
  [2XFullTransformationSemigroup[102X  53.7-3
  [2XFunctionAction[102X  41.12-4
  [2XFunctionField[102X (for an integral ring and a list of indeterminate numbers)  66.15-8
  [2XFunctionField[102X (for an integral ring and a list of indeterminates)  66.15-8
  [2XFunctionField[102X (for an integral ring and a list of names (and an exclusion list))  66.15-8
  [2XFunctionField[102X (for an integral ring and a rank (and an exclusion list))  66.15-8
  [10XFunctionOperation[110X  77.1
  functions, as in mathematics  32.
  functions, as in programming language  5.
  functions, definition by arrow notation  4.23
  functions, definition of  4.23
  functions, recursive  4.23
  functions, with a variable number of arguments  4.23
  functions, with a variable number of arguments, calling  4.11-1
  [2XFunctionsFamily[102X  5.5-3
  [2XFusionCharTableTom[102X  70.11-1
  [2XFusionConjugacyClasses[102X (for a homomorphism)  73.3-1
  [2XFusionConjugacyClasses[102X (for two character tables)  73.3-1
  [2XFusionConjugacyClasses[102X (for two groups)  73.3-1
  [2XFusionConjugacyClassesOp[102X (for a homomorphism)  73.3-1
  [2XFusionConjugacyClassesOp[102X (for two character tables)  73.3-1
  fusions  73.3
  [2XFusionsAllowedByRestrictions[102X  73.7-4
  [2XFusionsTom[102X  70.7-6
  [22XG[122X-sets  41.12
  [22XG[122X-sets, computing orbits  85.3
  [22Xg_N[122X (irrational value)  18.4-1
  [10Xgac[110X  76.3-9
  [2XGaloisCyc[102X (for a cyclotomic)  18.5-1
  [2XGaloisCyc[102X (for a list of cyclotomics)  18.5-1
  [2XGaloisCyc[102X (for a class function)  72.4-2
  [2XGaloisField[102X (for characteristic and degree)  59.3-2
  [2XGaloisField[102X (for characteristic and polynomial)  59.3-2
  [2XGaloisField[102X (for field size)  59.3-2
  [2XGaloisField[102X (for subfield and degree)  59.3-2
  [2XGaloisField[102X (for subfield and polynomial)  59.3-2
  [2XGaloisGroup[102X (of rational class of a group)  39.10-8
  [2XGaloisGroup[102X (of field)  58.3-1
  [2XGaloisGroup[102X (for abelian number fields)  60.4-1
  [2XGaloisMat[102X  18.5-5
  [2XGaloisStabilizer[102X  60.2-5
  [2XGaloisType[102X  66.11-3
  [2XGamma[102X  19.2-1
  [2XGammaL[102X  50.2-9
  [11Xgap.ini[111X  3.2-1
  [2XGap3CatalogueIdGroup[102X  50.7-7
  [2XGAP_EXIT_CODE[102X  6.7-2
  [2XGAPInfo[102X  3.5-1
  [10XGAPInfo.Architecture[110X  76.3-5
  [10XGAPInfo.CommandLineOptions[110X  3.1
  [10XGAPInfo.Keywords[110X  4.5
  [2XGAPInfo.ProfileThreshold[102X  7.7-9
  [10XGAPInfo.RootPaths[110X  9.2
  [2XGAPInfo.TimeoutsSupported[102X  5.3-2
  [10XGAPInfo.UserGapRoot[110X  9.2
  [10XGAPInfo.Version[110X  7.8
  [2XGapInputPcGroup[102X  46.6-1
  [2XGapInputSCTable[102X  62.4-5
  [2XGAPKB_REW[102X  52.6-2
  [10XGAPTCENUM[110X  47.6-5
  [2XGasmanLimits[102X  7.11-3
  [2XGasmanMessageStatus[102X  7.11-2
  [2XGasmanStatistics[102X  7.11-1
  Gaussian algorithm  24.7
  [2XGaussianIntegers[102X  60.5-1
  [2XGaussianRationals[102X  60.1-3
  [2XGcd[102X (for (a ring and) a list of elements)  56.7-1
  [2XGcd[102X (for (a ring and) several elements)  56.7-1
  [2XGcdex[102X  14.3-5
  [2XGcdInt[102X  14.3-4
  [2XGcdOp[102X  56.7-2
  [2XGcdRepresentation[102X (for (a ring and) a list of elements)  56.7-3
  [2XGcdRepresentation[102X (for (a ring and) several elements)  56.7-3
  [2XGcdRepresentationOp[102X  56.7-4
  [2XGeneralisedEigenspaces[102X  24.8-2
  [2XGeneralisedEigenvalues[102X  24.8-1
  generalized characters  72.
  generalized conjugation technique  87.1
  [2XGeneralizedEigenspaces[102X  24.8-2
  [2XGeneralizedEigenvalues[102X  24.8-1
  [2XGeneralLinearGroup[102X (for dimension and a ring)  50.2-1
  [2XGeneralLinearGroup[102X (for dimension and field size)  50.2-1
  [2XGeneralMappingByElements[102X  32.2-1
  [2XGeneralMappingsFamily[102X  32.14-6
  [2XGeneralOrthogonalGroup[102X  50.2-6
  [2XGeneralSemilinearGroup[102X  50.2-9
  [2XGeneralUnitaryGroup[102X  50.2-3
  generator, of the prime residue group  15.3-3
  generator, of the prime residue group  15.3-4
  [2XGeneratorsOfAdditiveGroup[102X  55.3-4
  [2XGeneratorsOfAdditiveMagma[102X  55.3-2
  [2XGeneratorsOfAdditiveMagmaWithZero[102X  55.3-3
  [2XGeneratorsOfAlgebra[102X  62.9-1
  [2XGeneratorsOfAlgebraModule[102X  62.11-7
  [2XGeneratorsOfAlgebraWithOne[102X  62.9-2
  [2XGeneratorsOfDivisionRing[102X  58.1-6
  [2XGeneratorsOfDomain[102X  31.9-2
  [2XGeneratorsOfEquivalenceRelationPartition[102X  33.6-2
  [2XGeneratorsOfField[102X  58.1-7
  [2XGeneratorsOfGroup[102X  39.2-4
  [2XGeneratorsOfIdeal[102X  56.2-7
  [2XGeneratorsOfInverseMonoid[102X  51.3-4
  [2XGeneratorsOfInverseSemigroup[102X  51.3-3
  [2XGeneratorsOfLeftIdeal[102X  56.2-8
  [2XGeneratorsOfLeftModule[102X  57.1-4
  [2XGeneratorsOfLeftOperatorAdditiveGroup[102X  57.1-3
  [2XGeneratorsOfLeftVectorSpace[102X  61.3-1
  [2XGeneratorsOfMagma[102X  35.4-1
  [2XGeneratorsOfMagmaWithInverses[102X  35.4-3
  [2XGeneratorsOfMagmaWithOne[102X  35.4-2
  [2XGeneratorsOfMonoid[102X  51.2-7
  [2XGeneratorsOfNearAdditiveGroup[102X  55.3-4
  [2XGeneratorsOfNearAdditiveMagma[102X  55.3-2
  [2XGeneratorsOfNearAdditiveMagmaWithZero[102X  55.3-3
  [2XGeneratorsOfPresentation[102X  48.1-3
  [2XGeneratorsOfRightIdeal[102X  56.2-9
  [2XGeneratorsOfRightModule[102X  57.1-9
  [2XGeneratorsOfRightOperatorAdditiveGroup[102X  57.1-8
  [2XGeneratorsOfRing[102X  56.1-6
  [2XGeneratorsOfRingWithOne[102X  56.3-4
  [2XGeneratorsOfRws[102X  38.1-12
  [2XGeneratorsOfSemigroup[102X  51.1-8
  [10XGeneratorsOf[3XStruct[103X[10X[110X  31.3
  [2XGeneratorsOfTwoSidedIdeal[102X  56.2-7
  [2XGeneratorsOfVectorSpace[102X  61.3-1
  [2XGeneratorsPrimeResidues[102X  15.2-4
  [2XGeneratorsSmallest[102X  39.22-1
  [2XGeneratorsSubgroupsTom[102X  70.10-1
  [2XGeneratorSyllable[102X  37.5-3
  [2XGetCyclotomicsLimit[102X  18.6-1
  [2XGetFusionMap[102X  73.3-3
  getting help  2.1
  [2XGF[102X (for characteristic and degree)  59.3-2
  [2XGF[102X (for characteristic and polynomial)  59.3-2
  [2XGF[102X (for field size)  59.3-2
  [2XGF[102X (for subfield and degree)  59.3-2
  [2XGF[102X (for subfield and polynomial)  59.3-2
  [2XGL[102X (for dimension and a ring)  50.2-1
  [2XGL[102X (for dimension and field size)  50.2-1
  [2XGlobalMersenneTwister[102X  14.7-4
  [2XGlobalRandomSource[102X  14.7-4
  [2XGModuleByMats[102X (for empty list, the dimension, and a field)  69.1-1
  [2XGModuleByMats[102X (for generators and a field)  69.1-1
  [2XGO[102X  50.2-6
  [2XGQuotients[102X  40.9-4
  [2XGrading[102X  62.9-20
  graphviz  39.20-3
  [2XGreensDClasses[102X  51.8-9
  [2XGreensDClassOfElement[102X  51.8-8
  [2XGreensDRelation[102X  51.8-1
  [2XGreensHClasses[102X  51.8-9
  [2XGreensHClassOfElement[102X  51.8-8
  [2XGreensHRelation[102X  51.8-1
  [2XGreensJClasses[102X  51.8-9
  [2XGreensJClassOfElement[102X  51.8-8
  [2XGreensJRelation[102X  51.8-1
  [2XGreensLClasses[102X  51.8-9
  [2XGreensLClassOfElement[102X  51.8-8
  [2XGreensLRelation[102X  51.8-1
  [2XGreensRClasses[102X  51.8-9
  [2XGreensRClassOfElement[102X  51.8-8
  [2XGreensRRelation[102X  51.8-1
  [2XGroebnerBasis[102X (for a list and a monomial ordering)  66.18-1
  [2XGroebnerBasis[102X (for an ideal and a monomial ordering)  66.18-1
  [2XGroebnerBasisNC[102X  66.18-1
  [2XGroup[102X (for a list of generators (and an identity element))  39.2-1
  [2XGroup[102X (for several generators)  39.2-1
  group actions  41.
  group actions  41.2
  group actions, operations syntax  41.1
  group algebra  65.
  group characters  72.
  group operations  41.2
  group operations  77.1
  group ring  65.
  [2XGroupByGenerators[102X  39.2-2
  [2XGroupByGenerators[102X (with explicitly specified identity element)  39.2-2
  [2XGroupByRws[102X  46.4-6
  [2XGroupByRwsNC[102X  46.4-6
  [2XGroupGeneralMappingByImages[102X  40.1-3
  [2XGroupGeneralMappingByImages[102X (from group to itself)  40.1-3
  [2XGroupGeneralMappingByImagesNC[102X  40.1-3
  [2XGroupGeneralMappingByImagesNC[102X (from group to itself)  40.1-3
  [2XGroupHClassOfGreensDClass[102X  51.8-10
  [2XGroupHomomorphismByFunction[102X (by function (and inverse function) between two domains)  40.1-4
  [2XGroupHomomorphismByFunction[102X (by function and function that computes one preimage)  40.1-4
  [2XGroupHomomorphismByImages[102X  40.1-1
  [2XGroupHomomorphismByImagesNC[102X  40.1-2
  [2XGroupOfPcgs[102X  45.4-5
  [2XGroupRing[102X  65.1-2
  [2XGroupStabChain[102X  43.10-5
  [2XGroupWithGenerators[102X  39.2-3
  [2XGrowthFunctionOfGroup[102X  39.5-3
  [2XGrowthFunctionOfGroup[102X (with word length limit)  39.5-3
  [2XGU[102X  50.2-3
  [22Xh_N[122X (irrational value)  18.4-1
  [2XHallSubgroup[102X  39.13-3
  [2XHallSystem[102X  39.13-6
  [10XHallSystem[110X, for groups with pcgs  45.16
  [2XHasAbelianFactorGroup[102X  39.18-5
  [2XHasElementaryAbelianFactorGroup[102X  39.18-6
  [2XHasIndeterminateName[102X  66.1-4
  [2XHasParent[102X  31.7-1
  [2XHasseDiagramBinaryRelation[102X  33.4-4
  [2XHeadPcElementByNumber[102X  45.5-12
  [2XHELP_ADD_BOOK[102X  84.1-1
  [2XHELP_REMOVE_BOOK[102X  84.1-2
  [2XHELP_VIEWER_INFO[102X  84.4-1
  [2XHenselBound[102X  66.12-3
  Hermite normal form  77.3
  [2XHermiteNormalFormIntegerMat[102X  25.2-4
  [2XHermiteNormalFormIntegerMatTransform[102X  25.2-5
  [2XHeuristicCancelPolynomials[102X  66.24-3
  [2XHexStringInt[102X  27.7-8
  [2XHighestWeightModule[102X  64.14-5
  [2XHMSMSec[102X  27.10-7
  [2XHom[102X  61.10-5
  [2XHomeEnumerator[102X  41.12-5
  [2XHomomorphismQuotientSemigroup[102X  51.7-2
  homomorphisms, Frobenius, field  59.4-1
  homomorphisms, find all  40.9
  [2XHypothenuse[102X  19.2-1
  [22Xi_N[122X (irrational value)  18.4-2
  [2XIdeal[102X  56.2-1
  [2XIdealByGenerators[102X  56.2-4
  [2XIdealNC[102X  56.2-2
  [2XIdeals[102X  56.9-4
  [2XIdempotent[102X  53.2-4
  [2XIdempotents[102X  35.4-6
  [2XIdempotentsTom[102X  70.7-8
  [2XIdempotentsTomInfo[102X  70.7-8
  [2XIdentificationOfConjugacyClasses[102X  71.6-3
  [2XIdentifier[102X (for tables of marks)  70.7-9
  [2XIdentifier[102X (for character tables)  71.9-8
  [2XIdentity[102X  31.10-2
  [2XIdentityBinaryRelation[102X (for a degree)  33.1-3
  [2XIdentityBinaryRelation[102X (for a domain)  33.1-3
  [2XIdentityFromSCTable[102X  62.4-7
  [2XIdentityMapping[102X  32.2-9
  [2XIdentityMat[102X  24.5-1
  [2XIdentityTransformation[102X  53.2-8
  [2XIdFunc[102X  5.4-6
  [2XIdGap3SolvableGroup[102X  50.7-7
  [2XIdGroup[102X  50.7-5
  [2XIdSmallGroup[102X  50.7-5
  [2XIdsOfAllSmallGroups[102X  50.7-6
  [9Xif[109X statement  4.17
  [2XImage[102X (set of images of a collection under a mapping)  32.4-6
  [2XImage[102X (set of images of the source of a general mapping)  32.4-6
  [2XImage[102X (unique image of an element under a mapping)  32.4-6
  [10XImage[110X, for Frobenius automorphisms  59.4-1
  image, vector under matrix  24.3
  [2XImageElm[102X  32.4-5
  [2XImageListOfPartialPerm[102X  54.3-6
  [2XImageListOfTransformation[102X  53.5-2
  [2XImageOfPartialPermCollection[102X  54.3-5
  [2XImages[102X (set of images of a collection under a mapping)  32.4-7
  [2XImages[102X (set of images of an element under a mapping)  32.4-7
  [2XImages[102X (set of images of the source of a general mapping)  32.4-7
  [2XImagesElm[102X  32.4-3
  [2XImageSetOfPartialPerm[102X  54.3-7
  [2XImageSetOfTransformation[102X  53.5-3
  [2XImagesRepresentative[102X  32.4-2
  [2XImagesSet[102X  32.4-4
  [2XImagesSmallestGenerators[102X  40.3-5
  [2XImagesSource[102X  32.4-1
  [2XImaginaryPart[102X  18.5-2
  [2XImfInvariants[102X  50.12-3
  [2XImfMatrixGroup[102X  50.12-4
  [2XImfNumberQClasses[102X  50.12-1
  [2XImfNumberQQClasses[102X  50.12-1
  [2XImfNumberZClasses[102X  50.12-1
  [2XImmutable[102X  12.6-3
  [2XImmutableBasis[102X  61.8-4
  [2XImmutableMatrix[102X  24.14-1
  [9Xin[109X, for lists  21.8-1
  [9Xin[109X, operation for  30.6
  [10X\in[110X, operation for testing membership  30.6
  [2XIncreaseInterval[102X  19.2-4
  [2XIndependentGeneratorExponents[102X  39.22-6
  [2XIndependentGeneratorsOfAbelianGroup[102X  39.22-5
  [2XIndeterminate[102X (for a family and a number)  66.1-1
  [2XIndeterminate[102X (for a ring (and a name, and an exclusion list))  66.1-1
  [2XIndeterminate[102X (for a ring (and a number))  66.1-1
  [2XIndeterminateName[102X  66.1-4
  [2XIndeterminateness[102X  73.5-13
  [2XIndeterminateNumberOfLaurentPolynomial[102X  66.13-3
  [2XIndeterminateNumberOfUnivariateRationalFunction[102X  66.1-2
  [2XIndeterminateOfUnivariateRationalFunction[102X  66.1-3
  [2XIndeterminatesOfFunctionField[102X  66.15-2
  [2XIndeterminatesOfPolynomialRing[102X  66.15-2
  [2XIndex[102X (for a group and its subgroup)  39.3-2
  [2XIndex[102X (for two character tables)  71.12-1
  [2XIndexInWholeGroup[102X  39.3-3
  [2XIndexNC[102X (for a group and its subgroup)  39.3-2
  [2XIndexPeriodOfPartialPerm[102X  54.3-16
  [2XIndexPeriodOfTransformation[102X  53.5-15
  [2XIndicator[102X  71.12-5
  [2XIndicatorOp[102X  71.12-5
  [2XIndicesCentralNormalSteps[102X  45.11-7
  [2XIndicesChiefNormalSteps[102X  45.11-15
  [2XIndicesEANormalSteps[102X  45.11-3
  [2XIndicesInvolutaryGenerators[102X  47.6-9
  [2XIndicesNormalSteps[102X  45.11-17
  [2XIndicesOfAdjointBasis[102X  62.9-6
  [2XIndicesPCentralNormalStepsPGroup[102X  45.11-11
  [2XIndicesStabChain[102X  43.10-7
  [2XIndirected[102X  73.5-4
  [2XInducedAutomorphism[102X  40.7-6
  [2XInducedClassFunction[102X (for a given monomorphism)  72.9-3
  [2XInducedClassFunction[102X (for a supergroup)  72.9-3
  [2XInducedClassFunction[102X (for the character table of a supergroup)  72.9-3
  [2XInducedClassFunctions[102X  72.9-4
  [2XInducedClassFunctionsByFusionMap[102X  72.9-5
  [2XInducedCyclic[102X  72.9-6
  [2XInducedPcgs[102X  45.7-4
  [2XInducedPcgsByGenerators[102X  45.7-5
  [2XInducedPcgsByGeneratorsNC[102X  45.7-5
  [2XInducedPcgsByPcSequence[102X  45.7-2
  [2XInducedPcgsByPcSequenceAndGenerators[102X  45.7-6
  [2XInducedPcgsByPcSequenceNC[102X  45.7-2
  [2XInducedPcgsWrtFamilyPcgs[102X  46.1-3
  [2XInducedPcgsWrtSpecialPcgs[102X  45.13-8
  [2XInequalities[102X  72.14-5
  inequality, of booleans  20.3-1
  inequality, of records  29.5
  inequality test  4.12
  [2XInertiaSubgroup[102X  72.8-13
  [2XInf[102X  19.2-4
  [2Xinfinity[102X  18.2-1
  inflated class functions  72.9
  [2XInfo[102X  7.4-5
  [2XInfoAlgebra[102X  62.1-1
  [2XInfoAttributes[102X  13.6-4
  [2XInfoBckt[102X  43.12-4
  [2XInfoCharacterTable[102X  71.4-2
  [2XInfoCoh[102X  39.23-5
  [2XInfoComplement[102X  39.11-7
  [2XInfoCoset[102X  39.9-6
  [2XInfoFpGroup[102X  47.1-3
  [2XInfoGroebner[102X  66.18-4
  [2XInfoGroup[102X  39.2-8
  [2XInfoLattice[102X  39.20-9
  [2XInfoLevel[102X  7.4-4
  [2XInfoMatrix[102X  24.1-1
  [2XInfoMonomial[102X  75.1-1
  [2XInfoNumtheor[102X  15.1-1
  [2XInfoObsolete[102X  77.4-1
  [2XInfoOptions[102X  8.1-7
  [2XInfoPackageLoading[102X  76.2-4
  [2XInfoPcSubgroup[102X  39.21-6
  [2XInfoPoly[102X  66.5-8
  [2XInfoText[102X  12.8-3
  [2XInfoText[102X (for character tables)  71.9-9
  [10XInfoText[110X, (for Conway polynomials)  59.5-1
  [2XInfoTom[102X  70.6-1
  [2XInfoWarning[102X  7.4-7
  [2XInit[102X  14.7-3
  [2XInitFusion[102X  73.7-1
  [2XInitPowerMap[102X  73.6-1
  [2XInjectionZeroMagma[102X  35.2-13
  inner product, of group characters  72.8-5
  [2XInnerAutomorphism[102X  40.6-3
  [2XInnerAutomorphismNC[102X  40.6-3
  [2XInnerAutomorphismsAutomorphismGroup[102X  40.7-5
  [2XInParentFOA[102X  85.2-1
  [2XInputFromUser[102X  10.6-3
  [2XInputLogTo[102X (for streams)  10.4-6
  [2XInputLogTo[102X (for a filename)  9.7-5
  [2XInputLogTo[102X (stop logging input)  9.7-5
  [2XInputOutputLocalProcess[102X  10.8-2
  [2XInputTextFile[102X  10.5-1
  [2XInputTextNone[102X  10.9-1
  [2XInputTextString[102X  10.7-1
  [2XInputTextUser[102X  10.6-1
  [2XInsertTrivialStabilizer[102X  43.11-8
  [2XInstallAtExit[102X  6.7-5
  [2XInstallCharReadHookFunc[102X  10.10-1
  [2XInstalledPackageVersion[102X  76.3-3
  [2XInstallFactorMaintenance[102X  31.13-5
  [2XInstallFlushableValue[102X  79.18-9
  [2XInstallFlushableValueFromFunction[102X  79.18-9
  [2XInstallGlobalFunction[102X  79.18-7
  [2XInstallHandlingByNiceBasis[102X  61.12-1
  [2XInstallImmediateMethod[102X  78.6-1
  [2XInstallIsomorphismMaintenance[102X  31.13-6
  [2XInstallMethod[102X  78.2-1
  [2XInstallOtherMethod[102X  78.2-2
  [10XInstallReadlineMacro[110X  6.9-4
  [2XInstallSubsetMaintenance[102X  31.13-4
  [2XInstallTrueMethod[102X  78.7-1
  [2XInstallValue[102X  79.18-9
  [2XInt[102X  14.2-3
  [2XInt[102X (for a cyclotomic)  18.1-5
  [2XInt[102X (for strings)  27.9-1
  [2XInt[102X (for a FFE)  59.2-3
  [2XIntChar[102X  27.8-1
  integer part of a quotient  14.3-1
  [2XIntegers[102X (global variable)  14.1-1
  [2XIntegralizedMat[102X  25.4-4
  [2XIntegratedStraightLineProgram[102X  37.8-8
  [2XIntermediateGroup[102X  39.17-17
  [2XIntermediateResultOfSLP[102X  37.8-10
  [2XIntermediateResultOfSLPWithoutOverwrite[102X  37.8-11
  [2XIntermediateResultsOfSLPWithoutOverwrite[102X  37.8-12
  [2XIntermediateSubgroups[102X  39.17-18
  [2XInterpolatedPolynomial[102X  56.7-10
  [2XIntersectBlist[102X  22.4-3
  [2XIntersection[102X (for a list)  30.5-2
  [2XIntersection[102X (for various collections)  30.5-2
  [10XIntersection[110X, for groups with pcgs  45.16
  intersection, of collections  30.5-2
  intersection, of sets  21.19-7
  [2XIntersection2[102X  30.5-2
  [2XIntersectionBlist[102X (for a list)  22.3-2
  [2XIntersectionBlist[102X (for various boolean lists)  22.3-2
  [2XIntersectionsTom[102X  70.9-10
  [2XIntersectSet[102X  21.19-7
  [2XIntFFE[102X  59.2-3
  [2XIntFFESymm[102X (for a FFE)  59.2-4
  [2XIntFFESymm[102X (for a vector of FFEs)  59.2-4
  [2XIntHexString[102X  27.9-1
  [2XIntScalarProducts[102X  73.5-15
  [2XIntVecFFE[102X  59.2-5
  [2XInvariantBilinearForm[102X  44.5-1
  [2XInvariantElementaryAbelianSeries[102X  39.17-10
  [2XInvariantLattice[102X  44.6-6
  [2XInvariantQuadraticForm[102X  44.5-5
  [2XInvariantSesquilinearForm[102X  44.5-3
  [2XInvariantSubgroupsElementaryAbelianGroup[102X  39.21-2
  [2XInverse[102X  31.10-8
  [2XInverse[102X (for a pcword)  46.2-2
  [2XInverse[102X (for a transformation)  53.5-14
  Inverse, group homomorphism  40.2
  inverse, matrix  24.3
  inverse, of class function  72.4
  [2XInverseAttr[102X  31.10-8
  [2XInverseClasses[102X  71.9-10
  [2XInverseGeneralMapping[102X  32.2-3
  [2XInverseImmutable[102X  31.10-8
  [2XInverseMap[102X  73.5-2
  [2XInverseMatMod[102X  24.15-1
  [2XInverseMonoid[102X  51.3-2
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  [2XInverseOfTransformation[102X  53.5-13
  [2XInverseOp[102X  31.10-8
  [2XInverseRepresentative[102X  43.10-11
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  irrationalities  18.
  [2XIrrBaumClausen[102X  71.14-3
  [2XIrrConlon[102X  71.14-2
  [2XIrrDixonSchneider[102X  71.14-1
  irreducible character  72.8-3
  irreducible characters, computation  71.17
  [2XIrreducibleDifferences[102X  72.10-3
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  [10XIrreducibleModules[110X, for groups with pcgs  45.16
  [2XIrreducibleRepresentations[102X  71.14-4
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  [2XIrreducibleSolvableGroup[102X  50.11-6
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  [2XIs16BitsFamily[102X  37.6-7
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  [2XIsAdditivelyCommutativeElement[102X  31.15-2
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  [2XIsAdditivelyCommutativeElementCollection[102X  31.15-2
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  [2XIsAdditiveMagma[102X  55.1-4
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  [2XIsAlgebra[102X  62.8-3
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  [2XIsAlgebraicElement[102X  67.2-1
  [2XIsAlgebraicExtension[102X  67.1-2
  [2XIsAlgebraModuleElement[102X  62.11-8
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  [2XIsAlgebraModuleElementFamily[102X  62.11-8
  [2XIsAlgebraWithOne[102X  62.8-4
  [2XIsAlgebraWithOneGeneralMapping[102X  32.12-4
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  [2XIsAlmostSimple[102X (for a character table)  71.8-5
  [2XIsAlmostSimpleGroup[102X  39.15-11
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  [2XIsAssociative[102X  35.4-7
  [2XIsAssociativeElement[102X  31.15-1
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  [2XIsAssociativeElementCollection[102X  31.15-1
  [2XIsAssocWord[102X  37.1-1
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  [10XIsAttributeStoringRep[110X  80.5
  [10XIsAttributeStoringRep[110X  80.6
  [2XIsAutomorphismGroup[102X  40.7-4
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  [2XIsBijective[102X  32.3-6
  [2XIsBinaryRelation[102X  33.1-1
  [10XIsBinaryRelation[110X, same as IsEndoGeneralMapping  33.
  [2XIsBLetterAssocWordRep[102X  37.6-3
  [2XIsBLetterWordsFamily[102X  37.6-4
  [2XIsBlist[102X  22.1-1
  [2XIsBlistRep[102X  22.5-1
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  [2XIsBool[102X  20.1-1
  [2XIsBound[102X (for a list index)  21.5-1
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  [2XIsBound[102X (for a record component)  29.6-1
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  [2XIsBound\.[102X  29.7-3
  [2XIsBound\[\][102X  21.2-1
  [2XIsBoundElmWPObj[102X  86.2-1
  [2XIsBoundGlobal[102X  4.9-5
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  [2XIsBuiltFromGroup[102X  38.3-1
  [2XIsBuiltFromMagma[102X  38.3-1
  [2XIsBuiltFromMagmaWithInverses[102X  38.3-1
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  [2XIsBuiltFromSemigroup[102X  38.3-1
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  [2XIsCanonicalNiceMonomorphism[102X  40.5-4
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  [2XIsCharacter[102X  72.8-1
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  [2XIsCharCollection[102X  27.1-1
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  [2XIsCochain[102X  64.12-1
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  [2XIsCollection[102X  30.1-1
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  [2XIsCommutativeElement[102X  31.15-3
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  [2XIsCommutativeElementCollection[102X  31.15-3
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  [2XIsContainedInSpan[102X  61.8-5
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  [2XIsCyclicTom[102X  70.8-1
  [2XIsCyclotomic[102X  18.1-3
  [2XIsCyclotomicField[102X  60.2-4
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  [2XIsDenseList[102X  21.1-2
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  [2XIsDirectProductElement[102X  32.1-1
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  [2XIsDivisionRing[102X  58.1-1
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  [10XIsEndoGeneralMapping[110X, same as IsBinaryRelation  33.
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  [2XIsExtLElement[102X  31.14-8
  [2XIsExtRElement[102X  31.14-9
  [2XIsFamilyPcgs[102X  46.1-2
  [2XIsFFE[102X  59.1-1
  [2XIsFFECollColl[102X  59.1-1
  [2XIsFFECollCollColl[102X  59.1-1
  [2XIsFFECollection[102X  59.1-1
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  [10XIsFieldControlledByGaloisGroup[110X  58.3
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  [2XIsFinite[102X  30.4-2
  [2XIsFinite[102X (for a character table)  71.8-5
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  [2XIsFiniteOrdersPcgs[102X  45.4-2
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  [2XIsGL[102X  44.4-1
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  [2XIsGreensDRelation[102X  51.8-2
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  [2XIsGreensHRelation[102X  51.8-2
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  [2XIsGreensJRelation[102X  51.8-2
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  [2XIsNearAdditiveElementWithZero[102X  31.14-4
  [2XIsNearAdditiveGroup[102X  55.1-3
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  [2XIsNearAdditiveMagmaWithInverses[102X  55.1-3
  [2XIsNearAdditiveMagmaWithZero[102X  55.1-2
  [2XIsNearlyCharacterTable[102X  71.4-1
  [2XIsNearRingElement[102X  31.14-15
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  [2XIsNilpotent[102X (for a character table)  71.8-5
  [10XIsNilpotent[110X, for groups with pcgs  45.16
  [2XIsNilpotentElement[102X  64.9-5
  [2XIsNilpotentGroup[102X  39.15-3
  [2XIsNilpotentTom[102X  70.8-1
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  isomorphic, pc group  46.4-8
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  [2XIsomorphicSubgroups[102X  40.9-5
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  [10XIsomorphismFpGroup[110X, for subgroups of fp groups  47.12
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  [2XIsomorphismFpGroupByGeneratorsNC[102X  47.11-2
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  [2XIsomorphismReesMatrixSemigroup[102X  51.9-3
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  [10XIsomorphism[3XRep[103X[10X[3XStruct[103X[10X[110X  31.5
  isomorphisms, find all  40.9-1
  [2XIsomorphismSCAlgebra[102X (for an algebra)  62.10-12
  [2XIsomorphismSCAlgebra[102X (w.r.t. a given basis)  62.10-12
  [2XIsomorphismSimplifiedFpGroup[102X  47.12-1
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  [2XIsomorphismTransformationMonoid[102X  53.7-5
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  [2XIsomorphismTypeInfoFiniteSimpleGroup[102X (for a group)  39.15-12
  [2XIsomorphismTypeInfoFiniteSimpleGroup[102X (for a character table)  71.8-5
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  [2XIsPadicExtensionNumber[102X  68.2-3
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  [2XIsParentPcgsFamilyPcgs[102X  46.1-4
  [2XIsPartialOrderBinaryRelation[102X  33.2-6
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  [2XIsPartialPermCollection[102X  54.1-2
  [2XIsPartialPermMonoid[102X  54.7-1
  [2XIsPartialPermSemigroup[102X  54.7-1
  [2XIsPcGroup[102X  46.3-1
  [2XIsPcGroupGeneralMappingByImages[102X  40.10-8
  [2XIsPcGroupHomomorphismByImages[102X  40.10-8
  [2XIsPcgs[102X  45.2-2
  [2XIsPcgsCentralSeries[102X  45.11-5
  [2XIsPcgsChiefSeries[102X  45.11-13
  [2XIsPcgsElementaryAbelianSeries[102X  45.11-1
  [2XIsPcgsPCentralSeriesPGroup[102X  45.11-9
  [2XIsPerfect[102X (for a character table)  71.8-5
  [2XIsPerfectGroup[102X  39.15-5
  [2XIsPerfectTom[102X  70.8-1
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  [2XIsPermCollColl[102X  42.1-2
  [2XIsPermCollection[102X  42.1-2
  [2XIsPermGroup[102X  43.1-1
  [2XIsPermGroupGeneralMapping[102X  40.10-5
  [2XIsPermGroupGeneralMappingByImages[102X  40.10-5
  [2XIsPermGroupHomomorphism[102X  40.10-5
  [2XIsPermGroupHomomorphismByImages[102X  40.10-5
  [2XIsPGroup[102X  39.15-19
  [2XIsPInfinity[102X  19.2-5
  [2XIsPNilpotent[102X  39.15-24
  [2XIsPolycyclicGroup[102X  39.15-7
  [2XIsPolynomial[102X  66.4-4
  [2XIsPolynomialDefaultRep[102X  66.21-5
  [2XIsPolynomialFunction[102X  66.4-1
  [2XIsPolynomialFunctionsFamily[102X  66.19-2
  [2XIsPolynomialRing[102X  66.15-4
  [2XIsPosInt[102X  14.2-2
  [2XIsPositiveIntegers[102X  14.1-2
  [2XIsPosRat[102X  17.2-2
  [2XIsPreimagesByAsGroupGeneralMappingByImages[102X  40.10-4
  [2XIsPreOrderBinaryRelation[102X  33.2-5
  [2XIsPrime[102X  56.5-8
  [2XIsPrimeField[102X  58.2-5
  [2XIsPrimeInt[102X  14.4-2
  [2XIsPrimeOrdersPcgs[102X  45.4-3
  [2XIsPrimePowerInt[102X  14.4-4
  [2XIsPrimitive[102X (for a group, an action domain, etc.)  41.10-7
  [2XIsPrimitive[102X (for an external set)  41.10-7
  [2XIsPrimitiveCharacter[102X  75.3-2
  [2XIsPrimitivePolynomial[102X  66.4-12
  [2XIsPrimitiveRootMod[102X  15.3-4
  [2XIsProbablyPrimeInt[102X  14.4-2
  [2XIsPseudoCanonicalBasisFullHomModule[102X  61.10-8
  [2XIsPSolubleCharacterTable[102X  71.12-3
  [2XIsPSolubleCharacterTableOp[102X  71.12-3
  [2XIsPSolvable[102X  39.15-23
  [2XIsPSolvableCharacterTable[102X  71.12-3
  [2XIsPSolvableCharacterTableOp[102X  71.12-3
  [2XIsPurePadicNumber[102X  68.1-5
  [2XIsPurePadicNumberFamily[102X  68.1-6
  [2XIsQuasiPrimitive[102X  75.3-3
  [2XIsQuaternion[102X  62.8-8
  [2XIsQuaternionCollColl[102X  62.8-8
  [2XIsQuaternionCollection[102X  62.8-8
  [2XIsQuickPositionList[102X  21.23-1
  [2XIsQuotientSemigroup[102X  51.7-1
  [2XIsRandomSource[102X  14.7-1
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  [2XIsRat[102X  17.2-1
  [2XIsRationalFunction[102X  66.4-1
  [2XIsRationalFunctionDefaultRep[102X  66.21-1
  [2XIsRationalFunctionsFamily[102X  66.19-2
  [2XIsRationalMatrixGroup[102X  44.6-2
  [2XIsRationals[102X  17.1-1
  [2XIsRationalsPolynomialRing[102X  66.15-7
  [2XIsRDistributive[102X  56.4-4
  [2XIsReadableFile[102X  9.6-2
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  [2XIsRecord[102X  29.1-1
  [2XIsRecordCollColl[102X  29.1-1
  [2XIsRecordCollection[102X  29.1-1
  [2XIsRectangularTable[102X  21.1-5
  [2XIsReduced[102X  38.1-7
  [2XIsReductionOrdering[102X  34.4-3
  [2XIsReesCongruence[102X  51.6-2
  [2XIsReesCongruenceSemigroup[102X  51.4-7
  [2XIsReesMatrixSemigroup[102X  51.9-7
  [2XIsReesMatrixSemigroupElement[102X  51.9-4
  [2XIsReesMatrixSubsemigroup[102X  51.9-6
  [2XIsReesZeroMatrixSemigroup[102X  51.9-7
  [2XIsReesZeroMatrixSemigroupElement[102X  51.9-4
  [2XIsReesZeroMatrixSubsemigroup[102X  51.9-6
  [2XIsReflexiveBinaryRelation[102X  33.2-1
  [2XIsRegular[102X (for a group, an action domain, etc.)  41.10-5
  [2XIsRegular[102X (for an external set)  41.10-5
  [2XIsRegularDClass[102X  51.8-12
  [2XIsRegularSemigroup[102X  51.4-1
  [2XIsRegularSemigroupElement[102X  51.4-2
  [2XIsRelativelySM[102X (for a character)  75.4-6
  [2XIsRelativelySM[102X (for a group)  75.4-6
  [2XIsRestrictedJacobianElement[102X  31.15-5
  [2XIsRestrictedJacobianElementCollColl[102X  31.15-5
  [2XIsRestrictedJacobianElementCollection[102X  31.15-5
  [2XIsRestrictedLieAlgebra[102X  64.8-1
  [2XIsRestrictedLieObject[102X  64.1-2
  [2XIsRestrictedLieObjectCollection[102X  64.1-2
  [2XIsRewritingSystem[102X  38.1-1
  [2XIsRightAlgebraModuleElement[102X  62.11-10
  [2XIsRightAlgebraModuleElementCollection[102X  62.11-10
  [2XIsRightCoset[102X  39.7-4
  [2XIsRightIdeal[102X  56.2-3
  [2XIsRightIdealInParent[102X  56.2-3
  [2XIsRightModule[102X  57.1-7
  [2XIsRightOperatorAdditiveGroup[102X  57.1-6
  [2XIsRightSemigroupIdeal[102X  51.5-3
  [2XIsRing[102X  56.1-1
  [2XIsRingElement[102X  31.14-16
  [2XIsRingElementWithInverse[102X  31.14-20
  [2XIsRingElementWithOne[102X  31.14-18
  [2XIsRingGeneralMapping[102X  32.12-1
  [2XIsRingHomomorphism[102X  32.12-1
  [2XIsRingWithOne[102X  56.3-1
  [2XIsRingWithOneGeneralMapping[102X  32.12-2
  [2XIsRingWithOneHomomorphism[102X  32.12-2
  [2XIsRootSystem[102X  64.6-3
  [2XIsRootSystemFromLieAlgebra[102X  64.6-4
  [2XIsRowModule[102X  57.3-6
  [2XIsRowSpace[102X  61.9-1
  [2XIsRowVector[102X  23.1-1
  [2XIsScalar[102X  31.14-20
  [2XIsSemiEchelonized[102X  61.9-7
  [2XIsSemigroup[102X  51.1-1
  [2XIsSemigroupCongruence[102X  51.6-1
  [2XIsSemigroupIdeal[102X  51.5-3
  [2XIsSemilatticeAsSemigroup[102X  77.6-1
  [2XIsSemiRegular[102X (for a group, an action domain, etc.)  41.10-4
  [2XIsSemiRegular[102X (for an external set)  41.10-4
  [2XIsSet[102X  21.17-4
  [2XIsShortLexLessThanOrEqual[102X  37.3-3
  [2XIsShortLexOrdering[102X  34.4-7
  [2XIsSimple[102X (for a character table)  71.8-5
  [2XIsSimpleAlgebra[102X  62.8-6
  [2XIsSimpleGroup[102X  39.15-10
  [2XIsSimpleSemigroup[102X  51.4-4
  [2XIsSingleValued[102X  32.3-2
  [2XIsSL[102X  44.4-3
  [2XIsSolvable[102X (for a character table)  71.8-5
  [2XIsSolvableGroup[102X  39.15-6
  [2XIsSolvableTom[102X  70.8-1
  [2XIsSortedList[102X  21.17-3
  [2XIsSpecialLinearGroup[102X  44.4-3
  [2XIsSpecialPcgs[102X  45.13-1
  [2XIsSPGeneralMapping[102X  32.14-1
  [2XIsSporadicSimple[102X (for a character table)  71.8-5
  [2XIsSSortedList[102X  21.17-4
  [2XIsStandardIterator[102X  30.8-1
  [2XIsStraightLineProgElm[102X  37.9-1
  [2XIsStraightLineProgram[102X  37.8-1
  [2XIsStream[102X  10.1-1
  [2XIsString[102X  27.1-2
  [2XIsStringRep[102X  27.4-1
  [10XIs[3XStruct[103X[10X[110X  31.6
  [2XIsSubgroup[102X  39.3-5
  [2XIsSubgroupFpGroup[102X  47.1-1
  [2XIsSubgroupOfWholeGroupByQuotientRep[102X  47.13-2
  [2XIsSubgroupSL[102X  44.4-5
  [2XIsSubmonoidFpMonoid[102X  52.1-2
  [2XIsSubnormal[102X  39.3-10
  [2XIsSubnormallyMonomial[102X (for a character)  75.4-5
  [2XIsSubnormallyMonomial[102X (for a group)  75.4-5
  [2XIsSubsemigroup[102X  51.1-4
  [2XIsSubsemigroupFpSemigroup[102X  52.1-1
  [2XIsSubset[102X  30.5-1
  [2XIsSubsetBlist[102X  22.2-4
  [2XIsSubsetLocallyFiniteGroup[102X  39.15-18
  [2XIsSubsetSet[102X  21.19-3
  [2XIsSubspacesVectorSpace[102X  61.4-2
  [10XIsSub[3Xstruct[103X[10X[110X  31.8
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  [10XIsSupersolvable[110X, for groups with pcgs  45.16
  [2XIsSupersolvableGroup[102X  39.15-8
  [2XIsSurjective[102X  32.3-5
  [2XIsSyllableAssocWordRep[102X  37.6-5
  [2XIsSyllableWordsFamily[102X  37.6-6
  [2XIsSymmetricBinaryRelation[102X  33.2-2
  [2XIsSymmetricGroup[102X  43.4-2
  [2XIsSymmetricInverseMonoid[102X  54.7-4
  [2XIsSymmetricInverseSemigroup[102X  54.7-4
  [2XIsTable[102X  21.1-4
  [2XIsTableOfMarks[102X  70.6-2
  [2XIsTableOfMarksWithGens[102X  70.10-3
  [2XIsToPcGroupGeneralMappingByImages[102X  40.10-9
  [2XIsToPcGroupHomomorphismByImages[102X  40.10-9
  [2XIsToPermGroupGeneralMappingByImages[102X  40.10-6
  [2XIsToPermGroupHomomorphismByImages[102X  40.10-6
  [2XIsTotal[102X  32.3-1
  [2XIsTotalOrdering[102X  34.3-2
  [2XIsTransformation[102X  53.1-1
  [2XIsTransformationCollection[102X  53.1-2
  [2XIsTransformationMonoid[102X  53.7-1
  [2XIsTransformationSemigroup[102X  53.7-1
  [2XIsTransitive[102X (for a group, an action domain, etc.)  41.10-1
  [2XIsTransitive[102X (for a permutation group)  41.10-1
  [2XIsTransitive[102X (for an external set)  41.10-1
  [2XIsTransitive[102X (for a character)  72.8-15
  [2XIsTransitiveBinaryRelation[102X  33.2-3
  [2XIsTranslationInvariantOrdering[102X  34.4-2
  [2XIsTrivial[102X  30.4-3
  [2XIsTwoSidedIdeal[102X  56.2-3
  [2XIsTwoSidedIdealInParent[102X  56.2-3
  [2XIsUEALatticeElement[102X  64.14-1
  [2XIsUEALatticeElementCollection[102X  64.14-1
  [2XIsUEALatticeElementFamily[102X  64.14-1
  [2XIsUniqueFactorizationRing[102X  56.4-2
  [2XIsUnit[102X  56.5-1
  [2XIsUnivariatePolynomial[102X  66.4-8
  [2XIsUnivariatePolynomialRing[102X  66.16-2
  [2XIsUnivariateRationalFunction[102X  66.4-6
  [2XIsUnknown[102X  74.1-3
  [2XIsUpperAlphaChar[102X  27.5-3
  [2XIsUpperTriangularMat[102X  24.4-9
  [2XIsValidIdentifier[102X  4.6-1
  [2XIsVector[102X  31.14-14
  [2XIsVectorSpace[102X  61.1-1
  [2XIsVirtualCharacter[102X  72.8-2
  [2XIsWeightLexOrdering[102X  34.4-9
  [2XIsWeightRepElement[102X  64.14-4
  [2XIsWeightRepElementCollection[102X  64.14-4
  [2XIsWeightRepElementFamily[102X  64.14-4
  [2XIsWellFoundedOrdering[102X  34.3-1
  [2XIsWeylGroup[102X  64.7-1
  [2XIsWholeFamily[102X  30.4-5
  [2XIsWLetterAssocWordRep[102X  37.6-3
  [2XIsWLetterWordsFamily[102X  37.6-4
  [2XIsWord[102X  36.1-1
  [2XIsWordCollection[102X  36.1-2
  [2XIsWordWithInverse[102X  36.1-1
  [2XIsWordWithOne[102X  36.1-1
  [2XIsWreathProductOrdering[102X  34.4-14
  [2XIsWritableFile[102X  9.6-3
  [2XIsXInfinity[102X  19.2-5
  [2XIsZero[102X  31.10-6
  [2XIsZeroGroup[102X  51.4-6
  [2XIsZeroSimpleSemigroup[102X  51.4-5
  [2XIsZeroSquaredElement[102X  31.15-6
  [2XIsZeroSquaredElementCollColl[102X  31.15-6
  [2XIsZeroSquaredElementCollection[102X  31.15-6
  [2XIsZeroSquaredRing[102X  56.4-7
  [2XIsZmodnZObj[102X  14.5-4
  [2XIsZmodnZObjNonprime[102X  14.5-4
  [2XIsZmodpZObj[102X  14.5-4
  [2XIsZmodpZObjLarge[102X  14.5-4
  [2XIsZmodpZObjSmall[102X  14.5-4
  [2XIterated[102X  21.20-27
  [2XIterator[102X  30.8-1
  iterator, for low index subgroups  47.10-1
  [2XIteratorByBasis[102X  61.6-6
  [2XIteratorByFunctions[102X  30.8-8
  [2XIteratorList[102X  30.8-6
  [2XIteratorOfCartesianProduct[102X (for a list of lists)  21.20-17
  [2XIteratorOfCartesianProduct[102X (for several lists)  21.20-17
  [2XIteratorOfCombinations[102X  16.2-2
  [2XIteratorOfPartitions[102X  16.2-19
  [2XIteratorOfTuples[102X  16.2-10
  [2XIteratorSorted[102X  30.8-2
  [2XIteratorStabChain[102X  43.10-10
  [22Xj_N[122X (irrational value)  18.4-4
  [2XJacobi[102X  15.4-1
  [2XJenningsLieAlgebra[102X  64.8-4
  [2XJenningsSeries[102X  39.17-14
  [2XJoinEquivalenceRelations[102X  33.6-3
  [2XJoinOfIdempotentPartialPermsNC[102X  54.2-4
  [2XJoinOfPartialPerms[102X  54.2-4
  [2XJoinStringsWithSeparator[102X  27.7-17
  [2XJordanDecomposition[102X  24.13-2
  [22Xk_N[122X (irrational value)  18.4-4
  [2XKappaPerp[102X  64.9-4
  [2XKB_REW[102X  52.6-2
  kernel, group homomorphism  40.2
  kernel, of a matrix  24.7-4
  [2XKernelOfAdditiveGeneralMapping[102X  32.10-5
  [2XKernelOfCharacter[102X  72.8-9
  [2XKernelOfMultiplicativeGeneralMapping[102X  32.9-5
  [2XKernelOfTransformation[102X  53.5-12
  [2XKeyDependentOperation[102X  85.1-1
  [2XKillingMatrix[102X  64.9-3
  [2XKnownAttributesOfObject[102X  13.5-1
  [2XKnownPropertiesOfObject[102X  13.7-1
  [2XKnownTruePropertiesOfObject[102X  13.7-2
  [2XKnowsDictionary[102X  28.3-5
  [2XKnowsHowToDecompose[102X  39.25-7
  [2XKnuthBendixRewritingSystem[102X (for a monoid and a reduction ordering)  52.6-3
  [2XKnuthBendixRewritingSystem[102X (for a semigroup and a reduction ordering)  52.6-3
  Krasner-Kaloujnine theorem  49.4-4
  [2XKroneckerProduct[102X  24.5-8
  [2XKuKGenerators[102X  49.4-4
  [22Xl_N[122X (irrational value)  18.4-4
  [2XLambda[102X  15.2-3
  larger or equal  4.12
  larger test  4.12
  [2XLargerQuotientBySubgroupAbelianization[102X  47.14-7
  [2XLargestElementGroup[102X  39.22-2
  [2XLargestElementStabChain[102X  43.10-14
  [2XLargestImageOfMovedPoint[102X (for a transformation coll)  53.5-10
  [2XLargestImageOfMovedPoint[102X (for a transformation)  53.5-10
  [2XLargestImageOfMovedPoint[102X (for a partial permutation coll)  54.3-15
  [2XLargestImageOfMovedPoint[102X (for a partial permutation)  54.3-15
  [2XLargestMovedPoint[102X (for a list or collection of permutations)  42.3-2
  [2XLargestMovedPoint[102X (for a permutation)  42.3-2
  [2XLargestMovedPoint[102X (for a transformation coll)  53.5-8
  [2XLargestMovedPoint[102X (for a transformation)  53.5-8
  [2XLargestMovedPoint[102X (for a partial perm coll)  54.3-13
  [2XLargestMovedPoint[102X (for a partial perm)  54.3-13
  [2XLargestUnknown[102X  74.1-2
  [10Xlast[110X  6.1
  [10Xlast2[110X  6.1
  [10Xlast3[110X  6.1
  [2XLastSystemError[102X  9.1-1
  LaTeX, for GAP objects  27.11
  LaTeX, for a decomposition matrix  71.11-4
  LaTeX, for permutation characters  72.13
  LaTeX, for the result of a straight line program  37.8-5
  [2XLaTeXStringDecompositionMatrix[102X  71.11-5
  lattice base reduction  25.5-1
  lattice base reduction  25.5-2
  lattice basis reduction, for virtual characters  72.10-4
  [2XLatticeByCyclicExtension[102X  39.21-1
  [2XLatticeGeneratorsInUEA[102X  64.14-2
  [2XLatticeSubgroups[102X  39.20-1
  [2XLatticeSubgroupsByTom[102X  70.3-3
  [2XLaurentPolynomialByCoefficients[102X  66.13-1
  [2XLaurentPolynomialByExtRep[102X  66.22-3
  [2XLaurentPolynomialByExtRepNC[102X  66.22-3
  [2XLClassOfHClass[102X  51.8-5
  [2XLcm[102X (for (a ring and) a list of elements)  56.7-6
  [2XLcm[102X (for (a ring and) several elements)  56.7-6
  [2XLcmInt[102X  14.3-6
  [2XLcmOp[102X  56.7-7
  [2XLeadCoeffsIGS[102X  45.7-7
  [2XLeadingCoefficient[102X  66.6-3
  [2XLeadingCoefficientOfPolynomial[102X  66.17-4
  [2XLeadingExponentOfPcElement[102X  45.5-5
  [2XLeadingMonomial[102X  66.6-4
  [2XLeadingMonomialOfPolynomial[102X  66.17-2
  [2XLeadingTermOfPolynomial[102X  66.17-3
  left cosets  39.7-4
  [2XLeftActingAlgebra[102X  62.11-11
  [2XLeftActingDomain[102X  57.1-11
  [2XLeftActingRingOfIdeal[102X  56.2-10
  [2XLeftAlgebraModule[102X  62.11-4
  [2XLeftAlgebraModuleByGenerators[102X  62.11-1
  [2XLeftDerivations[102X  64.2-6
  [2XLeftIdeal[102X  56.2-1
  [2XLeftIdealByGenerators[102X  56.2-5
  [2XLeftIdealNC[102X  56.2-2
  [2XLeftModuleByGenerators[102X  57.1-10
  [2XLeftModuleByHomomorphismToMatAlg[102X  62.11-17
  [2XLeftModuleGeneralMappingByImages[102X  61.10-1
  [2XLeftModuleHomomorphismByImages[102X  61.10-2
  [2XLeftModuleHomomorphismByImagesNC[102X  61.10-2
  [2XLeftModuleHomomorphismByMatrix[102X  61.10-3
  [2XLeftOne[102X (for a transformation)  53.5-22
  [2XLeftOne[102X (for a partial perm)  54.3-21
  [2XLeftQuotient[102X  31.12-2
  [10XLeftQuotient[110X, for words  37.4
  [2XLeftShiftRowVector[102X  23.5-1
  legacy  77.
  [2XLegendre[102X  15.4-2
  [2XLength[102X  21.17-5
  [2XLength[102X (for a associative word)  37.4-1
  length, of a word  37.4-1
  [2XLengthsTom[102X  70.7-3
  [2XLengthWPObj[102X  86.2-1
  [2XLenstraBase[102X  60.3-2
  [2XLessThanFunction[102X  34.3-5
  [2XLessThanOrEqualFunction[102X  34.3-6
  [2XLetterRepAssocWord[102X  37.6-8
  [2XLevelsOfGenerators[102X  34.4-15
  [2XLeviMalcevDecomposition[102X (for Lie algebras)  62.9-19
  [2XLexicographicOrdering[102X  34.4-5
  [2XLGFirst[102X  45.13-5
  [2XLGLayers[102X  45.13-4
  [2XLGLength[102X  45.13-6
  [2XLGWeights[102X  45.13-3
  library tables  71.3
  [2XLieAlgebra[102X (for an associative algebra)  64.2-3
  [2XLieAlgebra[102X (for field and generators)  64.2-3
  [2XLieAlgebraByStructureConstants[102X  64.2-1
  [2XLieBracket[102X  31.12-4
  [2XLieCenter[102X  64.3-1
  [2XLieCentralizer[102X  64.3-2
  [2XLieCentre[102X  64.3-1
  [2XLieCoboundaryOperator[102X  64.12-5
  [2XLieDerivedSeries[102X  64.4-1
  [2XLieDerivedSubalgebra[102X  64.3-4
  [2XLieFamily[102X  64.1-3
  [2XLieLowerCentralSeries[102X  64.4-2
  [2XLieNilRadical[102X  64.3-5
  [2XLieNormalizer[102X  64.3-3
  [2XLieObject[102X  64.1-1
  [2XLieSolvableRadical[102X  64.3-6
  [2XLieUpperCentralSeries[102X  64.4-3
  [2XLiftedInducedPcgs[102X  45.10-4
  [2XLiftedPcElement[102X  45.10-3
  [2XLinearAction[102X  45.14-2
  [2XLinearActionLayer[102X  45.14-3
  [2XLinearCharacters[102X (for a character table)  71.8-3
  [2XLinearCharacters[102X (for a group)  71.8-3
  [2XLinearCombination[102X  61.6-4
  [2XLinearCombinationPcgs[102X  45.5-7
  [2XLinearIndependentColumns[102X  25.4-2
  [2XLinearOperation[102X  45.14-2
  [2XLinearOperationLayer[102X  45.14-3
  [2XLinesOfStraightLineProgram[102X  37.8-3
  [2XList[102X (for a list (and a function))  21.20-19
  [2XList[102X (for a collection)  30.3-5
  list, sorted  21.17-3
  list and non-list, difference  21.13-4
  list and non-list, left quotient  21.14-6
  list and non-list, mod  21.14-5
  list and non-list, product  21.14-3
  list and non-list, quotient  21.14-4
  list assignment, operation  21.2
  list boundedness test, operation  21.2
  list element, access  21.3
  list element, assignment  21.4
  list element, operation  21.2
  list equal, comparison  21.10
  list of available books  2.2
  list smaller, comparison  21.10
  list unbind, operation  21.2
  [2XListBlist[102X  22.2-2
  [2XListN[102X  21.20-28
  [2XListOfDigits[102X  14.2-11
  [2XListPerm[102X  42.5-1
  [2XListStabChain[102X  43.10-8
  [2XListTransformation[102X  53.5-2
  [2XListWithIdenticalEntries[102X  21.15-1
  [2XListX[102X  21.21-1
  [2XLLL[102X  72.10-4
  LLL algorithm, for Gram matrices  25.5-2
  LLL algorithm, for vectors  25.5-1
  LLL algorithm, for virtual characters  72.10-4
  [2XLLLReducedBasis[102X  25.5-1
  [2XLLLReducedGramMat[102X  25.5-2
  [2XLoadDynamicModule[102X  76.3-10
  [2XLoadPackage[102X  76.2-1
  [9Xlocal[109X  4.23
  [2XLog[102X  19.2-1
  [2XLog10[102X  19.2-1
  [2XLog1p[102X  19.2-1
  [2XLog2[102X  19.2-1
  logarithm, discrete  15.3-2
  logarithm, of a root of unity  18.1-13
  [2XLogFFE[102X  59.2-2
  logical  20.
  Logical conjunction  20.4-2
  Logical disjunction  20.4-1
  Logical negation  20.4-3
  logical operations  20.4
  [2XLogInt[102X  14.2-8
  [2XLogMod[102X  15.3-2
  [2XLogModShanks[102X  15.3-2
  [2XLogPackageLoadingMessage[102X  76.2-4
  [2XLogTo[102X (for streams)  10.4-5
  [2XLogTo[102X (for a filename)  9.7-4
  [2XLogTo[102X (stop logging)  9.7-4
  [2XLongestWeylWordPerm[102X  64.7-5
  [2XLookupDictionary[102X  28.3-6
  loop, for  4.20
  loop, read eval print  6.1
  loop, repeat  4.19
  loop, while  4.18
  loop over iterator  4.20
  loop over object  4.20
  loop over range  4.20
  loops, leaving  4.21
  loops, restarting  4.22
  [2XLowercaseString[102X  27.7-11
  [2XLowerCentralSeriesOfGroup[102X  39.17-11
  [2XLowIndexSubgroupsFpGroup[102X  47.10-1
  [2XLowIndexSubgroupsFpGroupIterator[102X  47.10-1
  [10XLQUO[110X, for a permutation and transformation  53.4
  [10XLQUO[110X, for a permutation or partial permutation
          and partial permutation  54.5
  [2XLucas[102X  16.3-2
  [22Xm_N[122X (irrational value)  18.4-4
  [2XMagma[102X  35.2-1
  [2XMagmaByGenerators[102X  35.2-4
  [2XMagmaByMultiplicationTable[102X  35.3-1
  [2XMagmaElement[102X  35.3-4
  [2XMagmaHomomorphismByFunctionNC[102X  32.8-2
  [2XMagmaRingModuloSpanOfZero[102X  65.5-3
  [2XMagmaWithInverses[102X  35.2-3
  [2XMagmaWithInversesByGenerators[102X  35.2-6
  [2XMagmaWithInversesByMultiplicationTable[102X  35.3-3
  [2XMagmaWithOne[102X  35.2-2
  [2XMagmaWithOneByGenerators[102X  35.2-5
  [2XMagmaWithOneByMultiplicationTable[102X  35.3-2
  [2XMagmaWithZeroAdjoined[102X  35.2-13
  [2XMakeConfluent[102X  38.1-11
  [2XMakeFloat[102X  19.2-7
  [2XMakeImmutable[102X  12.6-4
  [2XMakeReadOnlyGlobal[102X  4.9-2
  [2XMakeReadWriteGlobal[102X  4.9-3
  map, parametrized  73.5
  [2XMappedWord[102X  36.3-1
  [2XMappingByFunction[102X (by function (and inverse function) between two domains)  32.2-2
  [2XMappingByFunction[102X (by function and function that computes one preimage)  32.2-2
  [2XMappingGeneratorsImages[102X  40.10-2
  [2XMappingPermListList[102X  42.5-3
  maps  73.
  [2XMarksTom[102X  70.7-1
  [2XMatAlgebra[102X  62.5-4
  [2XMatClassMultCoeffsCharTable[102X  71.12-9
  [2XMathieuGroup[102X  50.1-11
  [2XMatLieAlgebra[102X  64.2-5
  matrices, commutator  24.3
  [2XMatrix[102X  51.9-8
  matrix automorphisms  73.2-2
  matrix spaces  61.9
  [2XMatrixAlgebra[102X  62.5-4
  [2XMatrixAutomorphisms[102X  71.22-1
  [2XMatrixByBlockMatrix[102X  24.17-3
  [2XMatrixLieAlgebra[102X  64.2-5
  [2XMatrixOfAction[102X  62.11-15
  [2XMatScalarProducts[102X  72.8-6
  [2XMatTom[102X  70.7-10
  [2XMaximalAbelianQuotient[102X  39.18-4
  [2XMaximalBlocks[102X (for a group, an action domain, etc.)  41.11-2
  [2XMaximalBlocks[102X (for an external set)  41.11-2
  [2XMaximalNormalSubgroups[102X  39.19-9
  [2XMaximalSubgroupClassReps[102X  39.19-6
  [2XMaximalSubgroups[102X  39.19-7
  [10XMaximalSubgroups[110X, for groups with pcgs  45.16
  [2XMaximalSubgroupsLattice[102X  39.20-4
  [2XMaximalSubgroupsTom[102X  70.9-12
  [2XMaximum[102X (for a list)  21.20-13
  [2XMaximum[102X (for various objects)  21.20-13
  [2XMaximumList[102X  21.20-15
  meet strategy  87.2-4
  [2XMeetEquivalenceRelations[102X  33.6-3
  [2XMeetMaps[102X  73.5-8
  [2XMeetOfPartialPerms[102X  54.2-5
  [2XMemoryUsage[102X  12.8-5
  method  78.
  [2XMid[102X  19.2-4
  [2XMinimalElementCosetStabChain[102X  43.10-13
  [2XMinimalGeneratingSet[102X  39.22-3
  [10XMinimalGeneratingSet[110X, for groups with pcgs  45.16
  [2XMinimalNonmonomialGroup[102X  75.5-2
  [2XMinimalNormalSubgroups[102X  39.19-10
  [2XMinimalPolynomial[102X (over a field)  58.3-2
  [2XMinimalPolynomial[102X  66.8-1
  [10XMinimalPolynomial[110X, over a ring  66.8
  [2XMinimalStabChain[102X  43.8-5
  [2XMinimalSupergroupsLattice[102X  39.20-5
  [2XMinimalSupergroupsTom[102X  70.9-13
  [2XMinimizedBombieriNorm[102X  66.12-2
  [2XMinimum[102X (for a list)  21.20-14
  [2XMinimum[102X (for various objects)  21.20-14
  [2XMinimumList[102X  21.20-15
  [2XMinusCharacter[102X  73.6-5
  [9Xmod[109X  4.13
  mod, Integers  14.5-2
  mod, Laurent polynomials  66.2
  [9Xmod[109X, arithmetic operators  4.13
  [9Xmod[109X, for character tables  71.7
  mod, lists  21.14-5
  mod, rationals  4.13
  [9Xmod[109X, residue class rings  14.5
  modular inverse  4.13
  modular remainder  4.13
  modular roots  15.4-5
  [2XModuleByRestriction[102X  62.11-21
  [2XModuleOfExtension[102X  46.8-7
  modulo  4.13
  modulo, arithmetic operators  4.13
  modulo, residue class rings  14.5
  [2XModuloPcgs[102X  45.9-1
  [2XMoebiusMu[102X  15.5-3
  [2XMoebiusTom[102X  70.7-11
  [2XMolienSeries[102X  72.12-1
  [2XMolienSeriesInfo[102X  72.12-2
  [2XMolienSeriesWithGivenDenominator[102X  72.12-4
  [2XMonoid[102X (for a list)  51.2-2
  [2XMonoid[102X (for various generators)  51.2-2
  [2XMonoidByGenerators[102X  51.2-4
  [2XMonoidByMultiplicationTable[102X  51.2-10
  [2XMonoidOfRewritingSystem[102X  52.6-5
  [2XMonomialComparisonFunction[102X  66.17-5
  [2XMonomialExtGrlexLess[102X  66.17-14
  [2XMonomialExtrepComparisonFun[102X  66.17-6
  [2XMonomialGrevlexOrdering[102X  66.17-9
  [2XMonomialGrlexOrdering[102X  66.17-8
  [2XMonomialLexOrdering[102X  66.17-7
  [10XMonomialTotalDegreeLess[110X  77.4
  monomorphisms, find all  40.9-5
  [2XMorClassLoop[102X  40.9-6
  [2XMostFrequentGeneratorFpGroup[102X  47.6-8
  [2XMovedPoints[102X (for a list or collection of permutations)  42.3-3
  [2XMovedPoints[102X (for a permutation)  42.3-3
  [2XMovedPoints[102X (for a transformation coll)  53.5-5
  [2XMovedPoints[102X (for a transformation)  53.5-5
  [2XMovedPoints[102X (for a partial perm coll)  54.3-9
  [2XMovedPoints[102X (for a partial perm)  54.3-9
  [2XMTX[102X  69.3-1
  [2XMTX.BasesCompositionSeries[102X  69.7-9
  [2XMTX.BasesMaximalSubmodules[102X  69.7-5
  [2XMTX.BasesMinimalSubmodules[102X  69.7-4
  [2XMTX.BasesMinimalSupermodules[102X  69.7-8
  [2XMTX.BasesSubmodules[102X  69.7-3
  [2XMTX.BasisInOrbit[102X  69.11-4
  [2XMTX.BasisModuleEndomorphisms[102X  69.9-2
  [2XMTX.BasisModuleHomomorphisms[102X  69.9-1
  [2XMTX.BasisRadical[102X  69.7-6
  [2XMTX.BasisSocle[102X  69.7-7
  [2XMTX.CollectedFactors[102X  69.7-11
  [2XMTX.CompositionFactors[102X  69.7-10
  [2XMTX.DegreeSplittingField[102X  69.5-3
  [2XMTX.Dimension[102X  69.4-2
  [2XMTX.Distinguish[102X  69.10-5
  [2XMTX.Field[102X  69.4-3
  [2XMTX.Generators[102X  69.4-1
  [2XMTX.HomogeneousComponents[102X  69.6-3
  [2XMTX.Homomorphism[102X  69.10-3
  [2XMTX.Homomorphisms[102X  69.10-4
  [2XMTX.Indecomposition[102X  69.6-2
  [2XMTX.InducedAction[102X  69.8-5
  [2XMTX.InducedActionFactorMatrix[102X  69.8-4
  [2XMTX.InducedActionFactorModule[102X  69.8-3
  [2XMTX.InducedActionMatrix[102X  69.8-4
  [2XMTX.InducedActionMatrixNB[102X  69.8-4
  [2XMTX.InducedActionSubmodule[102X  69.8-2
  [2XMTX.InducedActionSubmoduleNB[102X  69.8-2
  [2XMTX.InvariantBilinearForm[102X  69.11-1
  [2XMTX.InvariantQuadraticForm[102X  69.11-3
  [2XMTX.InvariantSesquilinearForm[102X  69.11-2
  [2XMTX.IsAbsolutelyIrreducible[102X  69.5-2
  [2XMTX.IsEquivalent[102X  69.10-1
  [2XMTX.IsIndecomposable[102X  69.6-1
  [2XMTX.IsIrreducible[102X  69.5-1
  [2XMTX.IsomorphismIrred[102X  69.10-2
  [2XMTX.IsomorphismModules[102X  69.9-3
  [2XMTX.ModuleAutomorphisms[102X  69.9-4
  [2XMTX.NormedBasisAndBaseChange[102X  69.8-1
  [2XMTX.OrthogonalSign[102X  69.11-5
  [2XMTX.ProperSubmoduleBasis[102X  69.7-2
  [2XMTX.SubGModule[102X  69.7-1
  [2XMTX.SubmoduleGModule[102X  69.7-1
  multiple indices  21.3
  multiple indices, assignment  21.4
  multiplication  4.13
  multiplication, matrices  24.3
  multiplication, matrix and matrix list  24.3
  multiplication, matrix and matrix list  24.3
  multiplication, matrix and scalar  24.3
  multiplication, matrix and vector  24.3
  multiplication, operation  31.12-1
  multiplication, scalar and matrix  24.3
  multiplication, scalar and matrix list  24.3
  multiplication, scalar and matrix list  24.3
  multiplication, scalar and vector  23.2
  multiplication, vector and matrix  24.3
  multiplication, vector and matrix list  24.3
  multiplication, vector and scalar  23.2
  multiplication, vectors  23.2
  [2XMultiplicationTable[102X (for a list of elements)  35.3-5
  [2XMultiplicationTable[102X (for a magma)  35.3-5
  multiplicative order of an integer  15.3-1
  [2XMultiplicativeNeutralElement[102X  35.4-10
  [2XMultiplicativeZero[102X  35.4-11
  [2XMultiplicativeZeroOp[102X  31.10-4
  multiplicity, of constituents of a group character  72.8-5
  Multiplier  39.24-3
  multisets  21.19
  [2XMultRowVector[102X  23.4-3
  Murnaghan components  72.11-4
  Murnaghan components  72.11-5
  [2XMutableBasis[102X  61.8-2
  [2XMutableBasisOfClosureUnderAction[102X  62.9-11
  [2XMutableBasisOfIdealInNonassociativeAlgebra[102X  62.9-13
  [2XMutableBasisOfNonassociativeAlgebra[102X  62.9-12
  [10XMutableIdentityMat[110X  77.4
  [10XMutableNullMat[110X  77.4
  [2XName[102X  12.8-2
  [2XNameFunction[102X  5.1-1
  [2XNameRNam[102X  29.7-1
  [2XNamesFilter[102X  13.2-2
  [2XNamesGVars[102X  4.9-8
  [2XNamesLocalVariablesFunction[102X  5.1-3
  [2XNamesOfComponents[102X  79.10-1
  [2XNamesOfFusionSources[102X  73.3-5
  namespace  4.6-1
  namespace  4.9
  [2XNamesSystemGVars[102X  4.9-9
  [2XNamesUserGVars[102X  4.9-10
  [2XNaturalCharacter[102X (for a group)  72.7-2
  [2XNaturalCharacter[102X (for a homomorphism)  72.7-2
  [2XNaturalHomomorphismByGenerators[102X  32.8-3
  [2XNaturalHomomorphismByIdeal[102X  56.8-4
  [2XNaturalHomomorphismByIdeal[102X (for an algebra and an ideal)  62.10-7
  [2XNaturalHomomorphismByNormalSubgroup[102X  39.18-1
  [2XNaturalHomomorphismByNormalSubgroupNC[102X  39.18-1
  [2XNaturalHomomorphismBySubAlgebraModule[102X  62.11-22
  [2XNaturalHomomorphismBySubspace[102X  61.10-4
  [2XNaturalHomomorphismOfLieAlgebraFromNilpotentGroup[102X  64.8-6
  [2XNaturalLeqPartialPerm[102X  54.5-4
  [2XNaturalPartialOrder[102X  54.7-5
  [2XNearAdditiveGroup[102X  55.2-3
  [2XNearAdditiveGroupByGenerators[102X  55.2-6
  [2XNearAdditiveMagma[102X  55.2-1
  [2XNearAdditiveMagmaByGenerators[102X  55.2-4
  [2XNearAdditiveMagmaWithZero[102X  55.2-2
  [2XNearAdditiveMagmaWithZeroByGenerators[102X  55.2-5
  [2XNearlyCharacterTablesFamily[102X  71.4-3
  negative number  4.13
  [2XNegativeRoots[102X  64.6-8
  [2XNegativeRootVectors[102X  64.6-10
  [2XNestingDepthA[102X  21.12-4
  [2XNestingDepthM[102X  21.12-5
  [2XNewAttribute[102X  79.3-1
  [10XNewAttribute[110X, example  80.5
  [2XNewCategory[102X  79.1-1
  [2XNewConstructor[102X  79.6-1
  [2XNewDictionary[102X  28.2-1
  [2XNewFamily[102X  79.7-1
  [2XNewFilter[102X  79.4-1
  [2XNewFloat[102X  19.2-7
  [2XNewInfoClass[102X  7.4-1
  newline  4.4
  [2XNewmanInfinityCriterion[102X  47.16-2
  [2XNewOperation[102X  79.5-1
  [2XNewProperty[102X  79.3-2
  [2XNewRepresentation[102X  79.2-1
  [10XNewRepresentation[110X, example  80.6
  [2XNewType[102X  79.8-1
  [2XNextIterator[102X  30.8-5
  [2XNextPrimeInt[102X  14.4-5
  [2XNF[102X  60.1-2
  [2XNiceAlgebraMonomorphism[102X  62.10-9
  [2XNiceBasis[102X  61.11-4
  [2XNiceBasisFiltersInfo[102X  61.12-2
  [2XNiceFreeLeftModule[102X  61.11-1
  [2XNiceFreeLeftModuleInfo[102X  61.11-3
  [2XNiceMonomorphism[102X  40.5-2
  [2XNiceMonomorphismAutomGroup[102X  40.8-2
  [2XNiceObject[102X  40.5-3
  [2XNiceVector[102X  61.11-2
  [2XNilpotencyClassOfGroup[102X  39.15-4
  [2XNilpotentQuotientOfFpLieAlgebra[102X  64.11-2
  [2XNK[102X  18.4-5
  [10XNOAUTO[110X  76.2-1
  [2XNonabelianExteriorSquare[102X  39.24-5
  [2XNonnegativeIntegers[102X  14.1-1
  [2XNonnegIntScalarProducts[102X  73.5-15
  [2XNonNilpotentElement[102X  64.9-6
  [2XNorm[102X  58.3-4
  [2XNorm[102X (for a class function)  72.8-7
  [10XNorm[110X, of character  72.8-7
  [2XNormalBase[102X  58.3-7
  [2XNormalClosure[102X  39.11-4
  [2XNormalFormIntMat[102X  25.2-9
  [2XNormalIntersection[102X  39.11-5
  [2XNormalizedElementOfMagmaRingModuloRelations[102X  65.4-3
  [2XNormalizedWhitespace[102X  27.7-15
  normalizer  39.11
  [2XNormalizer[102X (for a group and a group element)  39.11-1
  [2XNormalizer[102X (for two groups)  39.11-1
  [2XNormalizerInGLnZ[102X  44.6-7
  [2XNormalizerInGLnZBravaisGroup[102X  44.6-14
  [2XNormalizersTom[102X  70.9-4
  [2XNormalizerTom[102X  70.9-4
  [2XNormalizeWhitespace[102X  27.7-14
  [2XNormalSeriesByPcgs[102X  45.11-18
  [2XNormalSubgroupClasses[102X  71.23-3
  [2XNormalSubgroupClassesInfo[102X  71.23-1
  [2XNormalSubgroups[102X  39.19-8
  [2XNormedRowVector[102X  23.2-1
  [2XNormedRowVectors[102X  61.9-11
  [10XNormedVectors[110X  77.4
  [9Xnot[109X  20.4-3
  [2XNrArrangements[102X  16.2-5
  [2XNrBasisVectors[102X  61.8-3
  [2XNrCombinations[102X  16.2-3
  [2XNrComponentsOfPartialPerm[102X  54.3-19
  [2XNrComponentsOfTransformation[102X  53.5-18
  [2XNrConjugacyClasses[102X  39.10-5
  [2XNrConjugacyClasses[102X (for a character table)  71.8-5
  [2XNrConjugacyClassesGL[102X  50.3-1
  [2XNrConjugacyClassesGU[102X  50.3-1
  [2XNrConjugacyClassesPGL[102X  50.3-1
  [2XNrConjugacyClassesPGU[102X  50.3-1
  [2XNrConjugacyClassesPSL[102X  50.3-1
  [2XNrConjugacyClassesPSU[102X  50.3-1
  [2XNrConjugacyClassesSL[102X  50.3-1
  [2XNrConjugacyClassesSLIsogeneous[102X  50.3-1
  [2XNrConjugacyClassesSU[102X  50.3-1
  [2XNrConjugacyClassesSUIsogeneous[102X  50.3-1
  [2XNrDerangements[102X  16.2-15
  [2XNrFixedPoints[102X (for a partial perm coll)  54.3-10
  [2XNrFixedPoints[102X (for a partial perm)  54.3-10
  [2XNrInputsOfStraightLineProgram[102X  37.8-4
  [2XNrMovedPoints[102X (for a list or collection of permutations)  42.3-4
  [2XNrMovedPoints[102X (for a permutation)  42.3-4
  [2XNrMovedPoints[102X (for a transformation coll)  53.5-6
  [2XNrMovedPoints[102X (for a transformation)  53.5-6
  [2XNrMovedPoints[102X (for a partial perm coll)  54.3-11
  [2XNrMovedPoints[102X (for a partial perm)  54.3-11
  [2XNrOrderedPartitions[102X  16.2-22
  [2XNrPartitions[102X  16.2-20
  [2XNrPartitionsSet[102X  16.2-17
  [2XNrPartitionTuples[102X  16.2-31
  [2XNrPermutationsList[102X  16.2-13
  [2XNrPolyhedralSubgroups[102X  71.12-6
  [2XNrPrimitiveGroups[102X  50.9-2
  [2XNrRestrictedPartitions[102X  16.2-26
  [2XNrSubsTom[102X  70.7-2
  [2XNrTransitiveGroups[102X  50.6-2
  [2XNrTuples[102X  16.2-11
  [2XNrUnorderedTuples[102X  16.2-7
  [2XNthRootsInGroup[102X  39.10-10
  [2XNullAlgebra[102X  62.5-5
  [2XNullMat[102X  24.5-2
  [2XNullspaceIntMat[102X  25.1-1
  [2XNullspaceMat[102X  24.7-4
  [2XNullspaceMatDestructive[102X  24.7-5
  [2XNullspaceModQ[102X  24.15-2
  [2XNumber[102X  21.20-21
  number, Bell  16.1-3
  number, Stirling, of the first kind  16.1-5
  number, Stirling, of the second kind  16.1-6
  number, binomial  16.1-2
  number field  60.2-2
  number fields, Galois group  60.4
  [2XNumberArgumentsFunction[102X  5.1-2
  [2XNumberFFVector[102X  23.3-2
  [2XNumberIrreducibleSolvableGroups[102X  50.11-2
  [2XNumberPerfectGroups[102X  50.8-4
  [2XNumberPerfectLibraryGroups[102X  50.8-5
  [2XNumberSmallGroups[102X  50.7-4
  [2XNumberSmallRings[102X  56.9-2
  [2XNumbersString[102X  27.7-20
  [2XNumberSyllables[102X  37.5-1
  [2XNumberTransformation[102X  53.2-6
  numerator, of a rational  17.2-4
  [2XNumeratorOfModuloPcgs[102X  45.9-3
  [2XNumeratorOfRationalFunction[102X  66.4-2
  [2XNumeratorRat[102X  17.2-4
  [2XObjByExtRep[102X (for creating a UEALattice element)  64.14-3
  [2XObjByExtRep[102X  79.16-1
  [2XObjectify[102X  79.9-1
  [2XObjectifyWithAttributes[102X  79.9-2
  obsolete  77.
  [2XOCOneCocycles[102X  39.23-3
  octal character codes  27.2
  [2XOctaveAlgebra[102X  62.5-3
  [9Xod[109X  4.20
  [2XOldGeneratorsOfPresentation[102X  48.9-2
  [2XOmega[102X  39.14-1
  [2XOmega[102X (construct an orthogonal group)  50.2-8
  OmniGraffle  39.20-3
  [2XONanScottType[102X  43.5-1
  [2XOnBreak[102X  6.4-3
  [2XOnBreakMessage[102X  6.4-4
  [2XOne[102X  31.10-2
  [2XOne[102X (for a partial perm)  54.3-22
  one cohomology  39.23
  [2XOneAttr[102X  31.10-2
  [2XOneCoboundaries[102X  39.23-2
  [2XOneCocycles[102X (for a group and a pcgs)  39.23-1
  [2XOneCocycles[102X (for generators and a group)  39.23-1
  [2XOneCocycles[102X (for generators and a pcgs)  39.23-1
  [2XOneCocycles[102X (for two groups)  39.23-1
  [2XOneFactorBound[102X  66.12-4
  [2XOneImmutable[102X  31.10-2
  [2XOneIrreducibleSolvableGroup[102X  50.11-4
  [10XOne[3XLibrary[103X[10XGroup[110X  50.5
  [2XOneMutable[102X  31.10-2
  [2XOneOfPcgs[102X  45.4-6
  [2XOneOp[102X  31.10-2
  [10XOnePrimitiveGroup[110X  50.5
  [2XOneSameMutability[102X  31.10-2
  [2XOneSM[102X  31.10-2
  [2XOneSmallGroup[102X  50.7-3
  [10XOneTransitiveGroup[110X  50.5
  [2XOnIndeterminates[102X (as a permutation action)  41.2-13
  [2XOnLeftInverse[102X  41.2-3
  [2XOnLines[102X  41.2-12
  [10XOnLines[110X, example  50.2-1
  [2XOnPairs[102X  41.2-6
  [2XOnPoints[102X  41.2-1
  [2XOnQuit[102X  8.1-4
  [2XOnRight[102X  41.2-2
  [2XOnSets[102X  41.2-4
  [2XOnSetsDisjointSets[102X  41.2-8
  [2XOnSetsSets[102X  41.2-7
  [2XOnSetsTuples[102X  41.2-9
  [2XOnSubspacesByCanonicalBasis[102X  41.2-15
  [2XOnSubspacesByCanonicalBasisConcatenations[102X  41.2-15
  [2XOnTuples[102X  41.2-5
  [2XOnTuplesSets[102X  41.2-10
  [2XOnTuplesTuples[102X  41.2-11
  [10XPCore[110X, see PCore  39.11-3
  [10XOperation[110X  77.1
  operation  78.
  [2XOperationAlgebraHomomorphism[102X (action on a free left module)  62.10-8
  [2XOperationAlgebraHomomorphism[102X (action w.r.t. a basis of the module)  62.10-8
  [10XOperationHomomorphism[110X  77.1
  operations, for booleans  20.4
  Operations for algebraic elements  67.2
  operators  4.7
  operators, arithmetic  4.13
  operators, associativity  4.13
  operators, for cyclotomics  18.3
  operators, for lists  21.11
  operators, precedence  4.12
  options  3.
  options, command line, filenames  3.1
  options, command line, internal  3.1
  options, under UNIX  3.1
  [9Xor[109X  20.4-1
  [2XOrbit[102X  41.4-1
  [2XOrbitFusions[102X  73.4-1
  [2XOrbitishFO[102X  85.3-2
  [2XOrbitLength[102X  41.4-4
  [2XOrbitLengths[102X (for a group, a set of seeds, etc.)  41.4-5
  [2XOrbitLengths[102X (for an external set)  41.4-5
  [2XOrbitLengthsDomain[102X (for a group and a set of seeds)  41.4-6
  [2XOrbitLengthsDomain[102X (of an external set)  41.4-6
  [2XOrbitPerms[102X  43.2-1
  [2XOrbitPowerMaps[102X  73.2-1
  [2XOrbits[102X (attribute)  41.4-2
  [2XOrbits[102X (operation)  41.4-2
  [10XOrbits[110X, as attributes for external sets  85.3
  [2XOrbitsDomain[102X (for a group and an action domain)  41.4-3
  [2XOrbitsDomain[102X (of an external set)  41.4-3
  [2XOrbitsishOperation[102X  85.3-1
  [2XOrbitsPerms[102X  43.2-2
  [2XOrbitStabChain[102X  43.10-6
  [2XOrbitStabilizer[102X  41.5-1
  [2XOrbitStabilizerAlgorithm[102X  41.5-3
  [2XOrder[102X  31.10-10
  [2XOrder[102X (for a class function)  72.4-3
  order, of a group  39.1
  order, of a list, collection or domain  30.4-6
  order, of the prime residue group  15.2-2
  ordered partitions, internal representation  87.2-1
  [2XOrderedPartitions[102X  16.2-21
  ordering, booleans  20.3-2
  ordering, of records  29.5
  [2XOrderingByLessThanFunctionNC[102X  34.2-1
  [2XOrderingByLessThanOrEqualFunctionNC[102X  34.2-2
  [2XOrderingOfRewritingSystem[102X  38.1-3
  [2XOrderingOnGenerators[102X  34.4-4
  [2XOrderingsFamily[102X  34.1-2
  [2XOrderMod[102X  15.3-1
  [2XOrderOfRewritingSystem[102X  38.1-3
  [2XOrdersClassRepresentatives[102X  71.9-1
  [2XOrdersTom[102X  70.7-2
  [2XOrdinal[102X  27.9-2
  ordinary character  72.8-1
  [2XOrdinaryCharacterTable[102X (for a character table)  71.8-4
  [2XOrdinaryCharacterTable[102X (for a group)  71.8-4
  [2XOrthogonalComponents[102X  72.11-4
  [2XOrthogonalEmbeddings[102X  25.6-1
  [2XOrthogonalEmbeddingsSpecialDimension[102X  72.10-6
  output, suppressing  6.1
  [2XOutputLogTo[102X (for streams)  10.4-7
  [2XOutputLogTo[102X (for a filename)  9.7-6
  [2XOutputLogTo[102X (stop logging output)  9.7-6
  [2XOutputTextFile[102X  10.5-2
  [2XOutputTextNone[102X  10.9-2
  [2XOutputTextString[102X  10.7-2
  [2XOutputTextUser[102X  10.6-2
  [2XOverlaps[102X  19.2-4
  overload  78.8
  [22Xp[122X-group  39.15-19
  package  76.
  [2XPACKAGE_DEBUG[102X  76.2-4
  [2XPACKAGE_ERROR[102X  76.2-4
  [2XPACKAGE_INFO[102X  76.2-4
  [2XPACKAGE_WARNING[102X  76.2-4
  [2XPackageVariablesInfo[102X  76.3-13
  [2XPadicCoefficients[102X  25.4-3
  [2XPadicExtensionNumberFamily[102X  68.2-1
  [2XPadicNumber[102X (for pure padics)  68.1-2
  [2XPadicNumber[102X (for a p-adic extension family and a list)  68.2-2
  [2XPadicNumber[102X (for a p-adic extension family and a rational)  68.2-2
  [2XPadicNumber[102X (for a pure p-adic numbers family and a list)  68.2-2
  [2XPadicValuation[102X  56.5-10
  [2XPager[102X  2.4-1
  [2XPageSource[102X  5.1-6
  [2XParametrized[102X  73.5-5
  parametrized maps  73.
  [2XParent[102X  31.7-1
  [2XParentPcgs[102X  45.7-3
  [2XParseRelators[102X  47.2-3
  partial order  33.2-6
  [2XPartialFactorization[102X  14.4-9
  [2XPartialOrderByOrderingFunction[102X  33.4-6
  [2XPartialOrderOfHasseDiagram[102X  33.2-11
  [2XPartialPerm[102X (for a dense image)  54.2-1
  [2XPartialPerm[102X (for a domain and image)  54.2-1
  [2XPartialPermFamily[102X  54.1-3
  [2XPartialPermOp[102X  54.2-2
  [2XPartialPermOpNC[102X  54.2-2
  [2XPartitions[102X  16.2-18
  partitions, improper, of an integer  16.2-21
  partitions, ordered, of an integer  16.2-21
  partitions, restricted, of an integer  16.2-25
  [2XPartitionsGreatestEQ[102X  16.2-24
  [2XPartitionsGreatestLE[102X  16.2-23
  [2XPartitionsSet[102X  16.2-16
  [2XPartitionTuples[102X  16.2-30
  [2XPcElementByExponents[102X  45.5-6
  [2XPcElementByExponentsNC[102X  45.5-6
  [2XPCentralLieAlgebra[102X  64.8-5
  [2XPCentralNormalSeriesByPcgsPGroup[102X  45.11-12
  [2XPCentralSeries[102X  39.17-13
  [2XPcGroupCode[102X  46.9-3
  [2XPcGroupFpGroup[102X  46.4-1
  [2XPcGroupWithPcgs[102X  46.5-1
  [2XPcgs[102X  45.2-1
  [2XPcgs_OrbitStabilizer[102X  45.15-2
  [2XPcgsByPcSequence[102X  45.3-1
  [2XPcgsByPcSequenceNC[102X  45.3-1
  [2XPcgsCentralSeries[102X  45.11-6
  [2XPcgsChiefSeries[102X  45.11-14
  [2XPcgsElementaryAbelianSeries[102X (for a group)  45.11-2
  [2XPcgsElementaryAbelianSeries[102X (for a list of normal subgroups)  45.11-2
  [2XPcgsPCentralSeriesPGroup[102X  45.11-10
  [2XPClassPGroup[102X  39.15-21
  [2XPCore[102X  39.11-3
  [2XPcSeries[102X  45.4-4
  perfect groups  50.8
  [2XPerfectGroup[102X (for a pair [ order, index ])  50.8-2
  [2XPerfectGroup[102X (for group order (and index))  50.8-2
  [2XPerfectIdentification[102X  50.8-3
  [2XPerfectResiduum[102X  39.12-8
  [2XPerform[102X  21.20-11
  [2XPermanent[102X  16.4-1
  [2XPermBounds[102X  72.14-3
  [2XPermCharInfo[102X  72.13-1
  [2XPermCharInfoRelative[102X  72.13-2
  [2XPermChars[102X  72.14-1
  [2XPermCharsTom[102X (from a character table)  70.11-2
  [2XPermCharsTom[102X (via fusion map)  70.11-2
  [2XPermComb[102X  72.14-4
  [2XPermLeftQuoPartialPerm[102X  54.5-1
  [2XPermLeftQuoPartialPermNC[102X  54.5-1
  [2XPermLeftQuoTransformation[102X  53.4-1
  [2XPermLeftQuoTransformationNC[102X  53.4-1
  [2XPermList[102X  42.5-2
  [2XPermListList[102X  21.20-12
  [2XPermutation[102X (for a group, an action domain, etc.)  41.9-1
  [2XPermutation[102X (for an external set)  41.9-1
  permutation character  73.7-2
  permutation characters, possible  72.13
  [2XPermutationCharacter[102X (for a group, an action domain, and a function)  72.7-3
  [2XPermutationCharacter[102X (for two groups)  72.7-3
  [2XPermutationCycle[102X  41.9-2
  [2XPermutationGModule[102X  69.2-1
  [2XPermutationMat[102X  24.5-5
  [2XPermutationOfImage[102X  53.3-3
  [2XPermutationsFamily[102X  42.1-3
  [2XPermutationsList[102X  16.2-12
  [2XPermutationTom[102X  70.5-2
  [2XPermuted[102X  21.20-18
  [2XPermuted[102X (as a permutation action)  41.2-14
  [2XPermuted[102X (for a class function)  72.4-2
  [2XPGL[102X  50.2-11
  [2XPGU[102X  50.2-13
  [2XPhi[102X  15.2-2
  point stabilizer  41.5
  [2XPolynomialByExtRep[102X  66.22-2
  [2XPolynomialByExtRepNC[102X  66.22-2
  [2XPolynomialCoefficientsOfPolynomial[102X  66.6-2
  [2XPolynomialDivisionAlgorithm[102X  66.17-13
  [2XPolynomialModP[102X  66.11-2
  [2XPolynomialReducedRemainder[102X  66.17-12
  [2XPolynomialReduction[102X  66.17-11
  [2XPolynomialRing[102X (for a ring and a list of indeterminate numbers)  66.15-1
  [2XPolynomialRing[102X (for a ring and a list of indeterminates)  66.15-1
  [2XPolynomialRing[102X (for a ring and a list of names (and an exclusion list))  66.15-1
  [2XPolynomialRing[102X (for a ring and a rank (and an exclusion list))  66.15-1
  [2XPOmega[102X  50.2-16
  [2XPopOptions[102X  8.1-2
  [2XPosition[102X  21.16-1
  [2XPositionBound[102X  21.16-9
  [2XPositionCanonical[102X  21.16-3
  [10XPositionFirstComponent[110X  77.4
  [2XPositionNonZero[102X  21.16-11
  [2XPositionNot[102X  21.16-10
  [2XPositionNthOccurrence[102X  21.16-4
  [2XPositionProperty[102X  21.16-7
  [2XPositions[102X  21.16-2
  [2XPositionSet[102X  21.16-6
  [2XPositionsOp[102X  21.16-2
  [2XPositionSorted[102X  21.16-5
  [10XPositionSortedOp[110X  21.16-5
  [2XPositionsProperty[102X  21.16-8
  [2XPositionStream[102X  10.3-7
  [2XPositionSublist[102X  21.16-12
  [2XPositionWord[102X  37.4-4
  positive number  4.13
  [2XPositiveIntegers[102X  14.1-1
  [2XPositiveRoots[102X  64.6-7
  [2XPositiveRootVectors[102X  64.6-9
  possible permutation characters  72.13
  [2XPossibleClassFusions[102X  73.3-6
  [2XPossibleFusionsCharTableTom[102X  70.11-1
  [2XPossiblePowerMaps[102X  73.1-2
  power  4.13
  power, matrix  24.3
  power, meaning for class functions  72.4
  power, of words  37.4
  power set  16.2-1
  [2XPowerMap[102X  73.1-1
  [2XPowerMapByComposition[102X  73.1-4
  [2XPowerMapOp[102X  73.1-1
  [2XPowerMapsAllowedBySymmetrizations[102X  73.6-6
  [2XPowerMod[102X  56.7-9
  [2XPowerModCoeffs[102X  23.7-5
  [2XPowerModInt[102X  14.3-10
  [2XPowerPartition[102X  16.2-29
  [2XPowerSubalgebraSeries[102X  62.9-4
  [2XPQuotient[102X  47.14-1
  precedence  4.13
  precedence test, for permutations  42.2-1
  [2XPrecisionFloat[102X  19.2-3
  Prefix  27.7-19
  [2XPrefrattiniSubgroup[102X  39.12-7
  [10XPrefrattiniSubgroup[110X, for groups with pcgs  45.16
  [2XPreImage[102X (set of preimages of a collection under a general mapping)  32.5-6
  [2XPreImage[102X (set of preimages of the range of a general mapping)  32.5-6
  [2XPreImage[102X (unique preimage of an element under a general mapping)  32.5-6
  [2XPreImageElm[102X  32.5-3
  [2XPreImagePartialPerm[102X  54.5-2
  [2XPreImages[102X (set of preimages of a collection under a general mapping)  32.5-7
  [2XPreImages[102X (set of preimages of an elm under a general mapping)  32.5-7
  [2XPreImages[102X (set of preimages of the range of a general mapping)  32.5-7
  [2XPreImagesElm[102X  32.5-2
  [2XPreImagesOfTransformation[102X  53.4-4
  [2XPreImagesRange[102X  32.5-1
  [2XPreImagesRepresentative[102X  32.5-4
  [2XPreImagesSet[102X  32.5-5
  preorder  33.2-5
  [2XPresentationFpGroup[102X  48.1-1
  [2XPresentationNormalClosure[102X  48.2-6
  [2XPresentationNormalClosureRrs[102X  48.2-5
  [2XPresentationSubgroup[102X  48.2-1
  [2XPresentationSubgroupMtc[102X  48.2-4
  [2XPresentationSubgroupRrs[102X (for a group and a coset table (and a string))  48.2-2
  [2XPresentationSubgroupRrs[102X (for two groups (and a string))  48.2-2
  [2XPresentationViaCosetTable[102X  48.1-5
  previous result  6.1
  [2XPrevPrimeInt[102X  14.4-6
  [2XPrimalityProof[102X  14.4-3
  primary subgroup generators  48.10-1
  [2XPrimaryGeneratorWords[102X  48.2-3
  prime residue group  15.
  prime residue group  15.2
  prime residue group, exponent  15.2-3
  prime residue group, generator  15.3-3
  prime residue group, generator  15.3-4
  prime residue group, order  15.2-2
  [2XPrimeBlocks[102X  71.11-1
  [2XPrimeBlocksOp[102X  71.11-1
  [2XPrimeDivisors[102X  14.4-8
  [2XPrimeField[102X  58.2-4
  [2XPrimePGroup[102X  39.15-20
  [2XPrimePowersInt[102X  14.4-11
  [2XPrimeResidues[102X  15.2-1
  [2XPrimes[102X  14.4-1
  primitive  41.10-7
  primitive root modulo an integer  15.3-3
  [2XPRIMITIVE_INDICES_MAGMA[102X  50.10-3
  [2XPrimitiveElement[102X  58.2-3
  [2XPrimitiveGroup[102X  50.9-1
  [2XPrimitiveGroupsIterator[102X  50.9-3
  [2XPrimitiveIdentification[102X  50.10-1
  [2XPrimitiveIndexIrreducibleSolvableGroup[102X  50.11-5
  [2XPrimitivePolynomial[102X  66.11-1
  [2XPrimitiveRoot[102X  59.3-3
  [2XPrimitiveRootMod[102X  15.3-3
  [2XPrint[102X  6.3-4
  [2XPrintAmbiguity[102X  73.5-14
  [2XPrintArray[102X  24.5-10
  [2XPrintCharacterTable[102X  71.13-5
  [2XPrintCSV[102X  10.11-2
  [2XPrintFactorsInt[102X  14.4-10
  [2XPrintFormattingStatus[102X  10.4-8
  [2XPrintObj[102X (for a string)  27.1-4
  [2XPrintObj[102X (for a ffe)  59.6-1
  [2XPrintObj[102X  6.3-5
  [2XPrintObj[102X (for a table of marks)  70.4-2
  [2XPrintObj[102X (for a character table)  71.13-2
  [2XPrintObj[102X (for class functions)  72.5-2
  [2XPrintString[102X  27.7-5
  [2XPrintTo[102X (for streams)  10.4-4
  [2XPrintTo[102X  9.7-3
  [2XProbabilityShapes[102X  66.11-4
  procedure call  4.16
  procedure call with arguments  4.16
  [2XProcess[102X  11.1-1
  [2XPROD_GF2MAT_GF2MAT_ADVANCED[102X  24.16-2
  [2XPROD_GF2MAT_GF2MAT_SIMPLE[102X  24.16-1
  [2XProduct[102X  21.20-25
  product, of words  37.4
  product, rational functions  66.2
  [2XProductCoeffs[102X  23.7-2
  [2XProductOfStraightLinePrograms[102X  37.8-13
  [2XProductSpace[102X  62.9-3
  [2XProductX[102X  21.21-4
  [2XProfileFunctions[102X  7.7-5
  [2XProfileGlobalFunctions[102X  7.7-2
  [2XProfileLineByLine[102X  7.7-14
  [2XProfileMethods[102X  7.7-7
  [2XProfileOperations[102X  7.7-3
  [2XProfileOperationsAndMethods[102X  7.7-4
  [2XProjectedInducedPcgs[102X  45.10-2
  [2XProjectedPcElement[102X  45.10-1
  [2XProjection[102X (for a domain and a positive integer)  32.2-11
  [2XProjection[102X (for a domain)  32.2-11
  [2XProjection[102X (for two domains)  32.2-11
  [2XProjection[102X (for group products)  49.6-2
  [10XProjection[110X, example for direct products  49.1-1
  [10XProjection[110X, example for semidirect products  49.2-1
  [10XProjection[110X, example for subdirect products  49.3-1
  [10XProjection[110X, example for wreath products  49.4-1
  [2XProjectionMap[102X  73.5-3
  projections, find all  40.9-4
  [2XProjectiveActionHomomorphismMatrixGroup[102X  44.3-2
  [2XProjectiveActionOnFullSpace[102X  44.3-1
  [2XProjectiveGeneralLinearGroup[102X  50.2-11
  [2XProjectiveGeneralUnitaryGroup[102X  50.2-13
  [2XProjectiveOmega[102X  50.2-16
  [2XProjectiveOrder[102X  24.14-3
  [2XProjectiveSpecialLinearGroup[102X  50.2-12
  [2XProjectiveSpecialUnitaryGroup[102X  50.2-14
  [2XProjectiveSymplecticGroup[102X  50.2-15
  prompt  6.1
  prompt, partial  6.1
  [2XPRump[102X  39.12-12
  [2XPseudoRandom[102X  30.7-2
  [2XPseudoRandom[102X (for finitely presented groups)  47.5-1
  [2XPSL[102X  50.2-12
  [2XPSP[102X  50.2-15
  [2XPSp[102X  50.2-15
  [2XPSU[102X  50.2-14
  [2XPthPowerImage[102X (for basis and element)  64.8-3
  [2XPthPowerImage[102X (for element and integer)  64.8-3
  [2XPthPowerImage[102X (for element)  64.8-3
  [2XPthPowerImages[102X  64.8-2
  [2XPurePadicNumberFamily[102X  68.1-1
  [2XPushOptions[102X  8.1-1
  [2XQuadratic[102X  18.5-4
  quadratic residue  15.4-1
  quadratic residue  15.4-2
  quadratic residue  15.4-3
  [2XQuaternionAlgebra[102X  62.5-1
  [2XQuaternionGroup[102X  50.1-7
  [10XQUIET[110X  77.4
  [2XQUIT[102X  6.7-1
  [9XQUIT[109X, emergency quit  6.7-1
  quit, in emergency  6.7
  [2XQUIT_GAP[102X  6.7-3
  [2XQUITTING[102X  6.7-5
  [2XQuoInt[102X  14.3-1
  [2XQuotient[102X  56.1-9
  quotient, for finitely presented groups  47.2-1
  quotient, matrices  24.3
  quotient, matrix and matrix list  24.3
  quotient, matrix and scalar  24.3
  quotient, of free monoid  52.5-1
  quotient, of free semigroup  52.2-1
  quotient, of words  37.4
  quotient, rational functions  66.2
  quotient, scalar and matrix  24.3
  quotient, scalar and matrix list  24.3
  quotient, vector and matrix  24.3
  [2XQuotientFromSCTable[102X  62.4-8
  [2XQuotientMod[102X  56.7-8
  [2XQuotientPolynomialsExtRep[102X  66.23-3
  [2XQuotientRemainder[102X  56.6-5
  [2XQuotientSemigroupCongruence[102X  51.7-3
  [2XQuotientSemigroupHomomorphism[102X  51.7-3
  [2XQuotientSemigroupPreimage[102X  51.7-3
  [2XQuotRemLaurpols[102X  66.5-6
  [22Xr_N[122X (irrational value)  18.4-2
  [2XRadicalGroup[102X  39.12-9
  [2XRadicalOfAlgebra[102X  62.9-16
  [2XRandom[102X (for integers)  14.2-12
  [2XRandom[102X (for random source and list)  14.7-2
  [2XRandom[102X (for random source and two integers)  14.7-2
  [2XRandom[102X (for rationals)  17.2-7
  [2XRandom[102X  30.7-1
  [2XRandom[102X (for a list or collection)  30.7-1
  [2XRandom[102X (for lower and upper bound)  30.7-1
  random seed  30.7-3
  [2XRandomBinaryRelationOnPoints[102X  33.3-2
  [2XRandomInvertibleMat[102X  24.6-2
  [2XRandomIsomorphismTest[102X  46.10-1
  [2XRandomList[102X  30.7-3
  [2XRandomMat[102X  24.6-1
  [2XRandomPartialPerm[102X (for a positive integer)  54.2-7
  [2XRandomPartialPerm[102X (for a set of positive
        integers)  54.2-7
  [2XRandomPartialPerm[102X (for domain and image)  54.2-7
  [2XRandomPrimitivePolynomial[102X  59.5-3
  [2XRandomSource[102X  14.7-5
  [2XRandomTransformation[102X  53.2-7
  [2XRandomUnimodularMat[102X  24.6-3
  range  21.22
  [2XRange[102X (of a general mapping)  32.3-7
  [2XRankAction[102X (for a group, an action domain, etc.)  41.10-3
  [2XRankAction[102X (for an external set)  41.10-3
  [2XRankFilter[102X  13.2-1
  [2XRankMat[102X  24.7-1
  [2XRankOfPartialPerm[102X  54.3-3
  [2XRankOfPartialPermCollection[102X  54.3-3
  [2XRankOfPartialPermSemigroup[102X  54.7-2
  [2XRankOfTransformation[102X (for a transformation and a list)  53.5-4
  [2XRankOfTransformation[102X (for a transformation and a positive integer)  53.5-4
  [2XRankPGroup[102X  39.15-22
  [2XRat[102X  17.2-6
  [2XRat[102X (for floats)  19.2-8
  [2XRat[102X (for strings)  27.9-1
  [2XRationalClass[102X  39.10-6
  [2XRationalClasses[102X  39.10-7
  [2XRationalFunctionByExtRep[102X  66.22-1
  [2XRationalFunctionByExtRepNC[102X  66.22-1
  [2XRationalFunctionByExtRepWithCancellation[102X  66.24-1
  [2XRationalFunctionsFamily[102X  66.19-1
  [2XRationalizedMat[102X  18.5-6
  [2XRationals[102X  17.1-1
  [2XRClassOfHClass[102X  51.8-5
  [2XRead[102X (for streams)  10.3-1
  [2XRead[102X  9.7-1
  read eval print loop  6.1
  [2XReadAll[102X  10.3-5
  [2XReadAllLine[102X  10.8-3
  [2XReadAsFunction[102X (for streams)  10.3-2
  [2XReadAsFunction[102X  9.7-2
  [2XReadByte[102X  10.3-3
  [2XReadCommandLineHistory[102X  6.9-3
  [2XReadCSV[102X  10.11-1
  [2XReadLine[102X  10.3-4
  [10XReadlineInitLine[110X  6.9-1
  [2XReadPackage[102X  76.3-1
  [10XReadPkg[110X  77.2
  [2XRealClasses[102X  71.9-11
  [2XRealizableBrauerCharacters[102X  72.15-4
  [2XRealPart[102X  18.5-2
  [2XRecNames[102X  29.1-2
  record, component access  29.2
  record, component assignment  29.3
  record, component variable  29.2
  record, component variable assignment  29.3
  record assignment, operation  29.7-3
  record boundness test, operation  29.7-3
  record component, operation  29.7-3
  record unbind, operation  29.7-3
  recursion  4.23
  [2XRedispatchOnCondition[102X  78.5-1
  redisplay a help section  2.2
  redisplay with next help viewer  2.2
  [2XReduceCoeffs[102X  23.7-3
  [2XReduceCoeffsMod[102X  23.7-4
  [2XReducedAdditiveInverse[102X  38.2-1
  [2XReducedCharacters[102X  72.10-2
  [2XReducedClassFunctions[102X  72.10-1
  [2XReducedComm[102X  38.2-1
  [2XReducedConfluentRewritingSystem[102X  52.6-1
  [2XReducedConjugate[102X  38.2-1
  [2XReducedDifference[102X  38.2-1
  [2XReducedForm[102X  38.1-4
  [2XReducedGroebnerBasis[102X (for a list and a monomial ordering)  66.18-2
  [2XReducedGroebnerBasis[102X (for an ideal and a monomial ordering)  66.18-2
  [2XReducedInverse[102X  38.2-1
  [2XReducedLeftQuotient[102X  38.2-1
  [2XReducedOne[102X  38.2-1
  [2XReducedPcElement[102X  45.5-10
  [2XReducedPower[102X  38.2-1
  [2XReducedProduct[102X  38.2-1
  [2XReducedQuotient[102X  38.2-1
  [2XReducedScalarProduct[102X  38.2-1
  [2XReducedSum[102X  38.2-1
  [2XReducedZero[102X  38.2-1
  [2XReduceRules[102X  38.1-8
  [2XReduceStabChain[102X  43.11-5
  [2XRee[102X  50.1-13
  [2XReeGroup[102X  50.1-13
  [2XReesCongruenceOfSemigroupIdeal[102X  51.5-2
  [2XReesMatrixSemigroup[102X  51.9-1
  [2XReesMatrixSemigroupElement[102X  51.9-5
  [2XReesMatrixSubsemigroup[102X  51.9-2
  [2XReesZeroMatrixSemigroup[102X  51.9-1
  [2XReesZeroMatrixSemigroupElement[102X  51.9-5
  [2XReesZeroMatrixSubsemigroup[102X  51.9-2
  [2XRefinedPcGroup[102X  46.4-9
  [2XReflectionMat[102X  24.5-9
  reflexive relation  33.2-1
  [2XReflexiveClosureBinaryRelation[102X  33.4-1
  regular  41.10-5
  regular action  41.7-2
  [2XRegularActionHomomorphism[102X  41.8-2
  [2XRegularModule[102X  71.15-3
  relations  32.
  [2XRelationsOfFpSemigroup[102X  52.4-5
  [2XRelativeBasis[102X  61.5-4
  [2XRelativeBasisNC[102X  61.5-4
  [2XRelativeDiameter[102X  19.2-4
  relatively prime  4.13
  [2XRelativeOrderOfPcElement[102X  45.5-1
  [2XRelativeOrders[102X  45.4-1
  [10XRelativeOrders[110X, of a pcgs  45.4-1
  [2XRelatorsOfFpGroup[102X  47.4-3
  remainder, operation  31.12-1
  remainder of a quotient  14.3-3
  [2XRemInt[102X  14.3-3
  [2XRemove[102X  21.4-3
  remove, an element from a set  21.19-5
  [2XRemoveCharacters[102X  27.7-16
  [2XRemoveFile[102X  9.7-8
  [2XRemoveOuterCoeffs[102X  23.5-4
  [2XRemoveRelator[102X  48.5-4
  [2XRemoveSet[102X  21.19-5
  [2XRemoveStabChain[102X  43.11-6
  [9Xrepeat[109X loop  4.19
  [2XReplacedString[102X  27.7-13
  representation, as a sum of two squares  15.7-1
  [2XRepresentationsOfObject[102X  13.4-1
  [2XRepresentative[102X  30.4-7
  representative, of a list or collection  30.4-8
  [2XRepresentativeAction[102X  41.6-1
  [2XRepresentativeLinearOperation[102X  62.10-13
  [10XRepresentativeOperation[110X  77.1
  [2XRepresentativesContainedRightCosets[102X  39.9-2
  [2XRepresentativesFusions[102X  73.4-2
  [2XRepresentativeSmallest[102X  30.4-8
  [2XRepresentativesMinimalBlocks[102X (for a group, an action domain, etc.)  41.11-3
  [2XRepresentativesMinimalBlocks[102X (for an external set)  41.11-3
  [2XRepresentativesPerfectSubgroups[102X  39.20-6
  [2XRepresentativesPowerMaps[102X  73.2-2
  [2XRepresentativesSimpleSubgroups[102X  39.20-6
  [2XRepresentativeTom[102X  70.10-4
  [2XRepresentativeTomByGenerators[102X  70.10-4
  [2XRepresentativeTomByGeneratorsNC[102X  70.10-4
  [10XRequirePackage[110X  77.2
  [2XReread[102X  9.7-9
  [2XREREADING[102X  9.7-9
  [2XRereadPackage[102X  76.3-1
  [10XRereadPkg[110X  77.2
  [2XReset[102X  14.7-3
  [2XResetFilterObj[102X  79.4-3
  [2XResetOptionsStack[102X  8.1-3
  residue, quadratic  15.4-1
  residue, quadratic  15.4-2
  residue, quadratic  15.4-3
  [2XRespectsAddition[102X  32.10-1
  [2XRespectsAdditiveInverses[102X  32.10-2
  [2XRespectsInverses[102X  32.9-3
  [2XRespectsMultiplication[102X  32.9-1
  [2XRespectsOne[102X  32.9-2
  [2XRespectsScalarMultiplication[102X  32.11-1
  [2XRespectsZero[102X  32.10-3
  [2XRestrictedClassFunction[102X  72.9-1
  [2XRestrictedClassFunctions[102X  72.9-2
  [2XRestrictedLieAlgebraByStructureConstants[102X  64.2-2
  [2XRestrictedMapping[102X  32.2-12
  [2XRestrictedPartialPerm[102X  54.2-3
  [2XRestrictedPartitions[102X  16.2-25
  [2XRestrictedPerm[102X  42.5-4
  [2XRestrictedPermNC[102X  42.5-4
  [2XRestrictedTransformation[102X  53.3-2
  [2XRestrictedTransformationNC[102X  53.3-2
  [2XRestrictOutputsOfSLP[102X  37.8-9
  [2XResultant[102X  66.6-7
  [2XResultOfStraightLineProgram[102X  37.8-5
  [9Xreturn[109X  6.4-2
  [9Xreturn[109X, no value  4.24
  [9Xreturn[109X, with value  4.24
  return from break loop  6.4-2
  [2XReturnFail[102X  5.4-3
  [2XReturnFalse[102X  5.4-2
  [2XReturnFirst[102X  5.4-5
  [2XReturnNothing[102X  5.4-4
  [2XReturnTrue[102X  5.4-1
  [2XReversed[102X  21.20-7
  [2XReverseNaturalPartialOrder[102X  54.7-5
  [2XRewindStream[102X  10.3-8
  [2XRewriteWord[102X  47.9-4
  right cosets  39.7
  [2XRightActingAlgebra[102X  62.11-12
  [2XRightActingRingOfIdeal[102X  56.2-10
  [2XRightAlgebraModule[102X  62.11-5
  [2XRightAlgebraModuleByGenerators[102X  62.11-2
  [2XRightCoset[102X  39.7-1
  [2XRightCosets[102X  39.7-2
  [2XRightCosetsNC[102X  39.7-2
  [2XRightDerivations[102X  64.2-6
  [2XRightIdeal[102X  56.2-1
  [2XRightIdealByGenerators[102X  56.2-6
  [2XRightIdealNC[102X  56.2-2
  [2XRightModuleByHomomorphismToMatAlg[102X  62.11-18
  [2XRightOne[102X (for a transformation)  53.5-22
  [2XRightOne[102X (for a partial perm)  54.3-21
  [2XRightShiftRowVector[102X  23.5-2
  [2XRightTransversal[102X  39.8-1
  [2XRing[102X (for a collection)  56.1-2
  [2XRing[102X (for ring elements)  56.1-2
  [2XRingByGenerators[102X  56.1-4
  [2XRingByStructureConstants[102X  56.9-6
  [2XRingGeneralMappingByImages[102X  56.8-1
  [2XRingHomomorphismByImages[102X  56.8-2
  [2XRingHomomorphismByImagesNC[102X  56.8-3
  [2XRingWithOne[102X (for a collection)  56.3-2
  [2XRingWithOne[102X (for ring elements)  56.3-2
  [2XRingWithOneByGenerators[102X  56.3-3
  [2XRNamObj[102X (for a positive integer)  29.7-2
  [2XRNamObj[102X (for a string)  29.7-2
  root, of 1 modulo an integer  15.4-5
  root, of an integer  14.2-9
  root, of an integer modulo another  15.4-3
  root, of an integer, smallest  14.2-10
  [2XRootInt[102X  14.2-9
  [2XRootMod[102X  15.4-3
  [2XRootOfDefiningPolynomial[102X  58.2-8
  roots of unity  18.1-1
  [2XRootsMod[102X  15.4-4
  [2XRootsOfPolynomial[102X  66.5-4
  [2XRootsOfUPol[102X  66.5-5
  [2XRootsUnityMod[102X  15.4-5
  [2XRootSystem[102X  64.6-5
  [2XRound[102X  19.2-1
  [2XRoundCyc[102X  18.1-9
  row spaces  61.9
  [2XRows[102X  51.9-9
  [2XRREF[102X  24.7-2
  [2XRules[102X  38.1-2
  [2XRuntime[102X  7.6-2
  [2XRuntimes[102X  7.6-1
  [22Xs_N[122X (irrational value)  18.4-3
  [2XSameBlock[102X  71.11-2
  save  3.3-1
  [2XSaveCommandLineHistory[102X  6.9-3
  [2XSaveOnExitFile[102X  6.7-6
  [2XSaveWorkspace[102X  3.3-1
  saving on exit  6.7
  [2XScalarProduct[102X (for characters)  72.8-5
  Schreier  48.2
  Schreier-Sims, random  43.7
  Schur multiplier  39.24-3
  [2XSchurCover[102X  39.24-2
  [2XSchurCoverOfSymmetricGroup[102X  39.24-10
  scope  4.8
  [2XSec[102X  19.2-1
  [2XSech[102X  19.2-1
  [2XSecHMSM[102X  27.10-8
  secondary subgroup generators  48.10-1
  [2XSecondsDMYhms[102X  27.10-10
  [2XSeekPositionStream[102X  10.3-9
  [2XSemidirectProduct[102X (for a group of automorphisms and a group)  49.2-1
  [2XSemidirectProduct[102X (for acting group, action, and a group)  49.2-1
  [2XSemiEchelonBasis[102X  61.9-8
  [2XSemiEchelonBasisNC[102X  61.9-8
  [2XSemiEchelonMat[102X  24.10-1
  [2XSemiEchelonMatDestructive[102X  24.10-2
  [2XSemiEchelonMats[102X  24.10-4
  [2XSemiEchelonMatsDestructive[102X  24.10-5
  [2XSemiEchelonMatTransformation[102X  24.10-3
  semigroup  51.1-1
  [2XSemigroup[102X (for a list)  51.1-2
  [2XSemigroup[102X (for various generators)  51.1-2
  [2XSemigroupByGenerators[102X  51.1-5
  [2XSemigroupByMultiplicationTable[102X  51.1-11
  [2XSemigroupIdealByGenerators[102X  51.5-1
  [2XSemigroupOfRewritingSystem[102X  52.6-4
  semiregular  41.10-4
  [2XSemiSimpleType[102X  64.6-1
  sequence, Bernoulli  16.1-4
  sequence, Fibonacci  16.3-1
  sequence, Lucas  16.3-2
  [2XSet[102X  30.3-7
  set difference, of collections  30.5-4
  set stabilizer  41.5
  [2XSetAssertionLevel[102X  7.5-1
  [2XSetCommutator[102X  46.4-4
  [2XSetConjugate[102X  46.4-3
  [2XSetCrystGroupDefaultAction[102X  44.7-2
  [2XSetCyclotomicsLimit[102X  18.6-1
  [2XSetDefaultInfoOutput[102X  7.4-6
  [2XSetElmWPObj[102X  86.2-1
  [2XSetEntrySCTable[102X  62.4-4
  [2XSetFilterObj[102X  79.4-2
  [2XSetFloats[102X  19.2-9
  [2XSetGasmanMessageStatus[102X  7.11-2
  [2XSetHelpViewer[102X  2.3-1
  [2XSetIndeterminateName[102X  66.1-4
  [2XSetInfoHandler[102X  7.4-6
  [2XSetInfoLevel[102X  7.4-3
  [2XSetInfoOutput[102X  7.4-6
  [2XSetName[102X  12.8-1
  [2XSetNameObject[102X  6.3-7
  [2XSetPackagePath[102X  76.2-2
  [2XSetParent[102X  31.7-1
  [2XSetPower[102X  46.4-5
  [2XSetPrintFormattingStatus[102X  10.4-8
  [2XSetRecursionTrapInterval[102X  7.10-1
  [2XSetReducedMultiplication[102X  47.3-4
  Sets  21.
  sets  21.19
  setter  13.6
  [2XSetter[102X  13.6-2
  [2XSetUserPreference[102X  3.2-3
  [2XSetX[102X  21.21-2
  [2XShallowCopy[102X  12.7-1
  [10XShallowCopy[110X, for lists  21.7
  [2XShiftedCoeffs[102X  23.7-6
  [2XShiftedPadicNumber[102X  68.1-4
  short vectors spanning a lattice  25.5-1
  short vectors spanning a lattice  72.10-4
  [2XShortestVectors[102X  25.6-2
  [2XShortLexLeqPartialPerm[102X  54.5-5
  [2XShortLexOrdering[102X  34.4-6
  [2XShowAdditionTable[102X  55.4-2
  [2XShowArgument[102X  7.1-2
  [2XShowArguments[102X  7.1-1
  [2XShowDetails[102X  7.1-3
  [2XShowGcd[102X  56.7-5
  [2XShowImpliedFilters[102X  13.2-3
  [2XShowMethods[102X  7.1-4
  [2XShowMultiplicationTable[102X  55.4-2
  [2XShowOtherMethods[102X  7.1-5
  [2XShowPackageVariables[102X  76.3-13
  [2XShowUserPreferences[102X  3.2-3
  [2XShrinkAllocationPlist[102X  21.9-1
  [2XShrinkAllocationString[102X  27.4-5
  [2XShrinkRowVector[102X  23.5-3
  [2XShuffle[102X  21.20-8
  [2XSiftedPcElement[102X  45.5-8
  [2XSiftedPermutation[102X  43.10-12
  [2XSiftedVector[102X  61.9-12
  [2XSigma[102X  15.5-1
  [2XSigmaL[102X  50.2-10
  sign, of an integer  14.2-7
  [2XSignFloat[102X  19.2-1
  [2XSignInt[102X  14.2-7
  [2XSignPartition[102X  16.2-27
  [2XSignPerm[102X  42.4-1
  [2XSimpleGroup[102X  39.15-13
  [2XSimpleGroupsIterator[102X  39.15-14
  [2XSimpleLieAlgebra[102X  64.2-7
  [2XSimpleSystem[102X  64.6-11
  [2XSimplifiedFpGroup[102X  48.1-6
  [2XSimplifyPresentation[102X  48.6-2
  [2XSimsNo[102X  50.10-2
  [2XSimultaneousEigenvalues[102X  24.14-4
  [2XSin[102X  19.2-1
  [2XSinCos[102X  19.2-1
  [2XSingleCollector[102X  46.4-2
  singlequote character  27.2
  singlequotes  27.1
  [2XSinh[102X  19.2-1
  [2XSIntChar[102X  27.8-3
  [2XSize[102X  30.4-6
  [2XSize[102X (for a character table)  71.8-5
  [10XSize[110X, for groups with pcgs  45.16
  size, of a list or collection  30.4-6
  [2XSizeBlist[102X  22.2-3
  [2XSizeConsiderFunction[102X  39.21-4
  [2XSizeNumbersPerfectGroups[102X  50.8-6
  [2XSizeOfFieldOfDefinition[102X  72.15-3
  [2XSizesCentralisers[102X  71.9-2
  [2XSizesCentralizers[102X  71.9-2
  [2XSizesConjugacyClasses[102X  71.9-3
  [2XSizeScreen[102X  6.12-1
  [2XSizesPerfectGroups[102X  50.8-1
  [2XSizeStabChain[102X  43.10-3
  [2XSL[102X (for dimension and a field size)  50.2-2
  [2XSL[102X (for dimension and a ring)  50.2-2
  [2XSlotUsagePattern[102X  37.8-14
  smaller, associative words  37.3-2
  smaller, elements of finitely presented groups  47.3-2
  smaller, for pcwords  46.2-1
  smaller, for transformations  53.4
  smaller, nonassociative words  36.2-2
  smaller, rational functions  66.3
  smaller or equal  4.12
  smaller test  4.12
  [2XSmallerDegreePermutationRepresentation[102X  43.3-2
  [2XSmallestGeneratorPerm[102X  42.2-3
  [2XSmallestIdempotentPower[102X (for a transformation)  53.5-16
  [2XSmallestIdempotentPower[102X (for a partial perm)  54.3-17
  [2XSmallestImageOfMovedPoint[102X (for a transformation coll)  53.5-9
  [2XSmallestImageOfMovedPoint[102X (for a transformation)  53.5-9
  [2XSmallestImageOfMovedPoint[102X (for a partial permutation coll)  54.3-14
  [2XSmallestImageOfMovedPoint[102X (for a partial permutation)  54.3-14
  [2XSmallestMovedPoint[102X (for a list or collection of permutations)  42.3-1
  [2XSmallestMovedPoint[102X (for a permutation)  42.3-1
  [2XSmallestMovedPoint[102X (for a transformation coll)  53.5-7
  [2XSmallestMovedPoint[102X (for a transformation)  53.5-7
  [2XSmallestMovedPoint[102X (for a partial perm coll)  54.3-12
  [2XSmallestMovedPoint[102X (for a partial perm)  54.3-12
  [2XSmallestRootInt[102X  14.2-10
  [2XSmallGeneratingSet[102X  39.22-4
  [2XSmallGroup[102X (for a pair [ order, index ])  50.7-1
  [2XSmallGroup[102X (for group order and index)  50.7-1
  [2XSmallGroupsInformation[102X  50.7-8
  [2XSmallRing[102X  56.9-1
  [2XSmallSimpleGroup[102X  39.15-15
  Smith normal form  77.3
  [2XSmithNormalFormIntegerMat[102X  25.2-6
  [2XSmithNormalFormIntegerMatTransforms[102X  25.2-7
  [2XSMTX.AbsoluteIrreducibilityTest[102X  69.12-8
  [2XSMTX.AlgEl[102X  69.13-2
  [2XSMTX.AlgElCharPol[102X  69.13-4
  [2XSMTX.AlgElCharPolFac[102X  69.13-5
  [2XSMTX.AlgElMat[102X  69.13-3
  [2XSMTX.AlgElNullspaceDimension[102X  69.13-7
  [2XSMTX.AlgElNullspaceVec[102X  69.13-6
  [2XSMTX.CentMat[102X  69.13-8
  [2XSMTX.CentMatMinPoly[102X  69.13-9
  [2XSMTX.CompleteBasis[102X  69.12-11
  [2XSMTX.Getter[102X  69.12-6
  [2XSMTX.GoodElementGModule[102X  69.12-2
  [2XSMTX.IrreducibilityTest[102X  69.12-7
  [2XSMTX.MatrixSum[102X  69.12-10
  [2XSMTX.MinimalSubGModule[102X  69.12-9
  [2XSMTX.MinimalSubGModules[102X  69.12-4
  [2XSMTX.RandomIrreducibleSubGModule[102X  69.12-1
  [2XSMTX.Setter[102X  69.12-5
  [2XSMTX.SortHomGModule[102X  69.12-3
  [2XSMTX.Subbasis[102X  69.13-1
  [2XSO[102X  50.2-7
  [2XSocle[102X  39.12-10
  [2XSocleTypePrimitiveGroup[102X  43.5-2
  [2XSolutionIntMat[102X  25.1-2
  [2XSolutionMat[102X  24.7-6
  [2XSolutionMatDestructive[102X  24.7-7
  [2XSolutionNullspaceIntMat[102X  25.1-3
  [2XSolvableQuotient[102X (for a f.p. group and a list of primes)  47.14-5
  [2XSolvableQuotient[102X (for a f.p. group and a list of tuples)  47.14-5
  [2XSolvableQuotient[102X (for a f.p. group and a size)  47.14-5
  [2XSort[102X  21.18-1
  [2XSortBy[102X  21.18-1
  Sorted Lists as Collections  30.3
  [2XSortedCharacters[102X  71.21-2
  [2XSortedCharacterTable[102X (relative to the table of a factor group)  71.21-4
  [2XSortedCharacterTable[102X (w.r.t. a normal subgroup)  71.21-4
  [2XSortedCharacterTable[102X (w.r.t. a series of normal subgroups)  71.21-4
  [2XSortedList[102X  30.3-6
  [2XSortedSparseActionHomomorphism[102X  41.7-3
  [2XSortedTom[102X  70.5-1
  [2XSortex[102X  21.18-3
  [2XSortingPerm[102X  21.18-4
  [2XSortParallel[102X  21.18-2
  [2XSource[102X  32.3-8
  [2XSourceOfIsoclinicTable[102X  71.20-4
  [2XSP[102X (for dimension and a ring)  50.2-5
  [2XSP[102X (for dimension and field size)  50.2-5
  [2XSp[102X (for dimension and a ring)  50.2-5
  [2XSp[102X (for dimension and field size)  50.2-5
  space  4.4
  [2XSparseActionHomomorphism[102X  41.7-3
  [2XSparseCartanMatrix[102X  64.7-2
  [2XSparseHashTable[102X  28.7-1
  [2XSparseIntKey[102X  28.5-2
  special character sequences  27.2
  [2XSpecialLinearGroup[102X (for dimension and a field size)  50.2-2
  [2XSpecialLinearGroup[102X (for dimension and a ring)  50.2-2
  [2XSpecialOrthogonalGroup[102X  50.2-7
  [2XSpecialPcgs[102X (for a group)  45.13-2
  [2XSpecialPcgs[102X (for a pcgs)  45.13-2
  [2XSpecialSemilinearGroup[102X  50.2-10
  [2XSpecialUnitaryGroup[102X  50.2-4
  [2XSplitCharacters[102X  71.17-7
  [2XSplitExtension[102X  46.8-6
  [2XSplitExtensions[102X  46.8-10
  [2XSplitString[102X  27.7-12
  [2XSplittingField[102X  66.4-13
  Spreadsheet  10.11
  [2XSQ[102X (synonym of SolvableQuotient)  47.14-5
  [2XSqrt[102X  31.12-5
  [2XSquare[102X  19.2-1
  square root, of an integer  14.2-9
  [2XSquareRoots[102X  35.4-12
  [2XSSortedList[102X  30.3-7
  [2XStabChain[102X (for a group (and a record))  43.8-1
  [2XStabChain[102X (for a group and a base)  43.8-1
  [2XStabChainBaseStrongGenerators[102X  43.8-4
  [2XStabChainImmutable[102X  43.8-1
  [2XStabChainMutable[102X (for a group)  43.8-1
  [2XStabChainMutable[102X (for a homomorphism)  43.8-1
  [2XStabChainOp[102X  43.8-1
  [2XStabChainOptions[102X  43.8-2
  [2XStabilizer[102X  41.5-2
  [2XStabilizerOfExternalSet[102X  41.12-10
  [2XStabilizerPcgs[102X  45.15-1
  Stack trace  6.4-5
  [2XStandardAssociate[102X  56.5-5
  [2XStandardAssociateUnit[102X  56.5-6
  [2XStandardizeTable[102X  47.7-2
  [2XStandardWreathProduct[102X  49.4-1
  [2XStarCyc[102X  18.5-3
  [2XSTART_TEST[102X  7.9-1
  [2XStartlineFunc[102X  5.1-5
  [2XStartsWith[102X  27.7-19
  [2XState[102X  14.7-3
  Stirling number of the first kind  16.1-5
  Stirling number of the second kind  16.1-6
  [2XStirling1[102X  16.1-5
  [2XStirling2[102X  16.1-6
  [2XSTOP_TEST[102X  7.9-1
  [2XStoredGroebnerBasis[102X  66.18-3
  [2XStoreFusion[102X  73.3-4
  [2XStraightLineProgElm[102X  37.9-2
  [2XStraightLineProgGens[102X  37.9-3
  [2XStraightLineProgram[102X (for a list of lines (and the number of generators))  37.8-2
  [2XStraightLineProgram[102X (for a string and a list of generators names)  37.8-2
  [2XStraightLineProgramNC[102X (for a list of lines (and the number of generators))  37.8-2
  [2XStraightLineProgramNC[102X (for a string and a list of generators names)  37.8-2
  [2XStraightLineProgramsTom[102X  70.10-2
  [2XStreamsFamily[102X  10.1-9
  [2XStretchImportantSLPElement[102X  37.9-5
  strictly sorted list  21.17-4
  [2XString[102X (for a cyclotomic)  18.1-6
  [2XString[102X  27.7-6
  [2XStringDate[102X  27.10-6
  [2XStringFactorizationWord[102X  47.2-4
  [2XStringNumbers[102X  27.7-21
  [2XStringOfResultOfStraightLineProgram[102X  37.8-6
  [2XStringPP[102X  27.7-9
  strings, equality of  27.6-1
  strings, inequality of  27.6-1
  strings, lexicographic ordering of  27.6-2
  [2XStringTime[102X  27.10-9
  [2XStripLineBreakCharacters[102X  27.7-7
  [2XStrongGeneratorsStabChain[102X  43.10-4
  [2XStronglyConnectedComponents[102X  33.4-5
  [3XStruct[103X  31.3
  [10X[3XStruct[103X[10XByGenerators[110X  31.3
  [2XStructuralCopy[102X  12.7-2
  [10XStructuralCopy[110X, for lists  21.7
  structure constant  71.12-7
  structure constant  71.12-8
  structure constant  71.12-9
  [2XStructureConstantsTable[102X  62.4-2
  [2XStructureDescription[102X  39.6-1
  [10X[3XStruct[103X[10XWithGenerators[110X  31.3
  [2XSU[102X  50.2-4
  [2XSubadditiveGroup[102X  55.2-9
  [2XSubadditiveGroupNC[102X  55.2-9
  [2XSubadditiveMagma[102X  55.2-7
  [2XSubadditiveMagmaNC[102X  55.2-7
  [2XSubadditiveMagmaWithZero[102X  55.2-8
  [2XSubadditiveMagmaWithZeroNC[102X  55.2-8
  [2XSubalgebra[102X  62.6-1
  [2XSubAlgebraModule[102X  62.11-16
  [2XSubalgebraNC[102X  62.6-2
  [2XSubalgebraWithOne[102X  62.6-3
  [2XSubalgebraWithOneNC[102X  62.6-4
  [2XSubdirectProduct[102X  49.3-1
  [2XSubdirectProducts[102X  49.3-2
  Subdomains  31.8
  [2XSubfield[102X  58.2-1
  [2XSubfieldNC[102X  58.2-1
  [2XSubfields[102X  58.2-10
  [2XSubgroup[102X  39.3-1
  [2XSubgroup[102X (for a group)  39.3-1
  subgroup fusions  73.3
  subgroup generators tree  48.10-1
  [2XSubgroupByPcgs[102X  45.7-9
  [2XSubgroupByProperty[102X  39.3-11
  [2XSubgroupNC[102X  39.3-1
  [2XSubgroupOfWholeGroupByCosetTable[102X  47.8-2
  [2XSubgroupOfWholeGroupByQuotientSubgroup[102X  47.13-1
  [2XSubgroupProperty[102X  43.12-1
  subgroups, polyhedral  71.12-6
  [2XSubgroupShell[102X  39.3-12
  [2XSubgroupsSolvableGroup[102X  39.21-3
  sublist  21.3
  sublist, access  21.3
  sublist, assignment  21.4
  sublist, operation  21.3
  sublist assignment, operation  21.4
  [2XSubmagma[102X  35.2-7
  [2XSubmagmaNC[102X  35.2-7
  [2XSubmagmaWithInverses[102X  35.2-9
  [2XSubmagmaWithInversesNC[102X  35.2-9
  [2XSubmagmaWithOne[102X  35.2-8
  [2XSubmagmaWithOneNC[102X  35.2-8
  [2XSubmodule[102X  57.2-1
  [2XSubmoduleNC[102X  57.2-2
  [2XSubmonoid[102X  51.2-3
  [2XSubmonoidNC[102X  51.2-3
  [2XSubnearAdditiveGroup[102X  55.2-9
  [2XSubnearAdditiveGroupNC[102X  55.2-9
  [2XSubnearAdditiveMagma[102X  55.2-7
  [2XSubnearAdditiveMagmaNC[102X  55.2-7
  [2XSubnearAdditiveMagmaWithZero[102X  55.2-8
  [2XSubnearAdditiveMagmaWithZeroNC[102X  55.2-8
  [2XSubnormalSeries[102X  39.17-4
  [2XSubring[102X  56.1-7
  [2XSubringNC[102X  56.1-7
  [2XSubrings[102X  56.9-3
  [2XSubringWithOne[102X  56.3-5
  [2XSubringWithOneNC[102X  56.3-5
  [2XSubsemigroup[102X  51.1-3
  [2XSubsemigroupNC[102X  51.1-3
  subset test, for collections  30.5-1
  subsets  16.2-1
  [2XSubspace[102X  61.2-2
  [2XSubspaceNC[102X  61.2-2
  [2XSubspaces[102X  61.4-1
  [2XSubstitutedWord[102X (replace a subword by a given word)  37.4-5
  [2XSubstitutedWord[102X (replace an interval by a given word)  37.4-5
  [2XSubsTom[102X  70.7-1
  [10XSub[3Xstruct[103X[10X[110X  31.8
  [10XSub[3Xstruct[103X[10XNC[110X  31.8
  [2XSubSyllables[102X  37.5-4
  subtract, a set from another  21.19-8
  [2XSubtractBlist[102X  22.4-4
  subtraction  4.13
  subtraction, matrices  24.3
  subtraction, matrix and scalar  24.3
  subtraction, rational functions  66.2
  subtraction, scalar and matrix  24.3
  subtraction, scalar and matrix list  24.3
  subtraction, scalar and matrix list  24.3
  subtraction, scalar and vector  23.2
  subtraction, vector and scalar  23.2
  subtraction, vectors  23.2
  [2XSubtractSet[102X  21.19-8
  [2XSubword[102X  37.4-3
  [2XSuccessors[102X  33.2-9
  Suffix  27.7-19
  [2XSum[102X  21.20-26
  [2XSumFactorizationFunctionPcgs[102X  45.12-1
  [2XSumIntersectionMat[102X  24.11-4
  [2XSumX[102X  21.21-3
  [2XSup[102X  19.2-4
  [2XSupersolvableResiduum[102X  39.12-11
  support, email address  1.5
  [2XSupportedCharacterTableInfo[102X  71.3-4
  [2XSurjectiveActionHomomorphismAttr[102X  41.12-17
  [2XSuzukiGroup[102X  50.1-12
  [2XSylowComplement[102X  39.13-2
  [2XSylowSubgroup[102X  39.13-1
  [2XSylowSystem[102X  39.13-4
  symmetric group, power map  16.2-29
  symmetric power  72.11-2
  symmetric relation  33.2-2
  [2XSymmetricClosureBinaryRelation[102X  33.4-2
  [2XSymmetricGroup[102X (for a degree)  50.1-10
  [2XSymmetricGroup[102X (for a domain)  50.1-10
  [2XSymmetricInverseMonoid[102X  54.7-3
  [2XSymmetricInverseSemigroup[102X  54.7-3
  [2XSymmetricParentGroup[102X  43.4-4
  [2XSymmetricParts[102X  72.11-2
  [2XSymmetricPowerOfAlgebraModule[102X  64.15-3
  [2XSymmetrizations[102X  72.11-1
  symmetrizations, orthogonal  72.11-4
  symmetrizations, symplectic  72.11-5
  [2XSymplecticComponents[102X  72.11-5
  [2XSymplecticGroup[102X (for dimension and a ring)  50.2-5
  [2XSymplecticGroup[102X (for dimension and field size)  50.2-5
  syntax errors  6.1
  system getter  13.5
  system setter  13.5
  [2XSz[102X  50.1-12
  [22Xt_N[122X (irrational value)  18.4-3
  table automorphisms  73.4-2
  table automorphisms  73.7-3
  table of chapters for help books  2.2
  table of sections for help books  2.2
  [2XTableAutomorphisms[102X  71.22-2
  [2XTableOfMarks[102X (for a group)  70.3-1
  [2XTableOfMarks[102X (for a matrix)  70.3-1
  [2XTableOfMarks[102X (for a string)  70.3-1
  [2XTableOfMarksByLattice[102X  70.3-2
  [2XTableOfMarksComponents[102X  70.6-4
  [2XTableOfMarksCyclic[102X  70.12-1
  [2XTableOfMarksDihedral[102X  70.12-2
  [2XTableOfMarksFamily[102X  70.6-3
  [2XTableOfMarksFrobenius[102X  70.12-3
  tables  71.
  tables  71.3
  tabulator  4.4
  [2XTan[102X  19.2-1
  [2XTanh[102X  19.2-1
  [2XTau[102X  15.5-2
  [10XTCENUM[110X  47.6-5
  [2XTeachingMode[102X  6.13-1
  [2XTemporaryGlobalVarName[102X  4.9-11
  [2XTensored[102X  72.8-20
  [2XTensorProductGModule[102X  69.2-2
  [2XTensorProductOfAlgebraModules[102X (for a list of algebra modules)  64.15-1
  [2XTensorProductOfAlgebraModules[102X (for two algebra modules)  64.15-1
  [2XTest[102X  7.9-2
  test, for a primitive root  15.3-4
  test, for a rational  17.2-1
  test, for records  29.1-1
  test, for set equality  21.19-2
  [2XTestConsistencyMaps[102X  73.5-12
  [2XTestDirectory[102X  7.9-3
  tester  13.6
  [2XTester[102X  13.6-1
  [2XTestHomogeneous[102X  75.3-1
  [2XTestInducedFromNormalSubgroup[102X  75.3-4
  [2XTestJacobi[102X  62.4-6
  [2XTestMonomial[102X (for a character and a Boolean)  75.4-1
  [2XTestMonomial[102X (for a character)  75.4-1
  [2XTestMonomial[102X (for a group and a Boolean)  75.4-1
  [2XTestMonomial[102X (for a group)  75.4-1
  [2XTestMonomialQuick[102X (for a character)  75.4-4
  [2XTestMonomialQuick[102X (for a group)  75.4-4
  [2XTestMonomialUseLattice[102X  75.4-2
  [2XTestPackageAvailability[102X  76.3-2
  [2XTestPerm1[102X  72.14-2
  [2XTestPerm2[102X  72.14-2
  [2XTestPerm3[102X  72.14-2
  [2XTestPerm4[102X  72.14-2
  [2XTestPerm5[102X  72.14-2
  [2XTestQuasiPrimitive[102X  75.3-3
  [2XTestRelativelySM[102X (for a character and a normal subgroup)  75.4-6
  [2XTestRelativelySM[102X (for a character)  75.4-6
  [2XTestRelativelySM[102X (for a group and a normal subgroup)  75.4-6
  [2XTestRelativelySM[102X (for a group)  75.4-6
  [2XTestSubnormallyMonomial[102X (for a character)  75.4-5
  [2XTestSubnormallyMonomial[102X (for a group)  75.4-5
  [9Xthen[109X  4.17
  [10XThreeGroup[110X library  50.7
  [2XTietzeWordAbstractWord[102X  48.3-1
  [2Xtime[102X  7.6-3
  Timeouts  5.3
  [2XTrace[102X (of a matrix)  24.4-3
  [2XTrace[102X (for a field element)  58.3-5
  [2XTrace[102X (for a matrix)  58.3-5
  [2XTraceAllMethods[102X  7.3-2
  [2XTracedCosetFpGroup[102X  47.6-2
  [2XTraceImmediateMethods[102X  7.3-5
  [2XTraceMat[102X  24.4-3
  [2XTraceMethods[102X (for a list of operations)  7.3-1
  [2XTraceMethods[102X (for operations)  7.3-1
  [2XTracePolynomial[102X  58.3-3
  [2XTransferDiagram[102X  73.5-11
  [2XTransformation[102X (for a list and function)  53.2-1
  [2XTransformation[102X (for an image list)  53.2-1
  [2XTransformation[102X (for a source and destination)  53.2-2
  [2XTransformationByImageAndKernel[102X (for an image and kernel)  53.2-3
  [2XTransformationFamily[102X  53.1-3
  [2XTransformationList[102X (for an image list)  53.2-1
  [2XTransformationListList[102X (for a source and destination)  53.2-2
  [2XTransformationNumber[102X  53.2-6
  [2XTransformationOp[102X  53.2-5
  [2XTransformationOpNC[102X  53.2-5
  [2XTransformingPermutations[102X  71.22-3
  [2XTransformingPermutationsCharacterTables[102X  71.22-4
  transitive  41.10-1
  transitive relation  33.2-3
  [2XTransitiveClosureBinaryRelation[102X  33.4-3
  [2XTransitiveGroup[102X  50.6-1
  [2XTransitiveIdentification[102X  50.6-3
  [2XTransitivity[102X (for a group and an action domain)  41.10-2
  [2XTransitivity[102X (for an external set)  41.10-2
  [2XTransitivity[102X (for a character)  72.8-16
  [2XTranslatorSubalgebra[102X  62.11-24
  transporter  41.6
  [2XTransposedMat[102X  24.5-6
  [2XTransposedMatAttr[102X  24.5-6
  [2XTransposedMatDestructive[102X  24.5-7
  [2XTransposedMatImmutable[102X  24.5-6
  [2XTransposedMatMutable[102X  24.5-6
  [2XTransposedMatOp[102X  24.5-6
  [2XTransposedMatrixGroup[102X  44.2-4
  [2XTriangulizedIntegerMat[102X  25.2-1
  [2XTriangulizedIntegerMatTransform[102X  25.2-2
  [2XTriangulizedMat[102X  24.7-2
  [2XTriangulizedNullspaceMat[102X  24.7-4
  [2XTriangulizedNullspaceMatDestructive[102X  24.7-5
  [2XTriangulizeIntegerMat[102X  25.2-3
  [2XTriangulizeMat[102X  24.7-3
  [2XTrimPartialPerm[102X  54.5-6
  [2XTrimTransformation[102X  53.5-23
  [2XTrivialCharacter[102X (for a character table)  72.7-1
  [2XTrivialCharacter[102X (for a group)  72.7-1
  [2XTrivialGroup[102X  50.1-1
  [2XTrivialIterator[102X  30.8-7
  [2XTrivialSubalgebra[102X  62.6-5
  [2XTrivialSubgroup[102X  39.12-1
  [2XTrivialSubmagmaWithOne[102X  35.4-13
  [2XTrivialSubmodule[102X  57.2-4
  [2XTrivialSubmonoid[102X  51.2-8
  [2XTrivialSubnearAdditiveMagmaWithZero[102X  55.3-6
  [2XTrivialSubspace[102X  61.3-2
  [2XTrunc[102X  19.2-1
  [2XTryCosetTableInWholeGroup[102X  47.8-1
  [2XTryGcdCancelExtRepPolynomials[102X  66.24-2
  [2XTryNextMethod[102X  78.4-1
  tuple stabilizer  41.5
  [2XTuples[102X  16.2-8
  [2XTwoClosure[102X  43.12-3
  [2XTwoCoboundaries[102X  46.8-1
  [2XTwoCocycles[102X  46.8-2
  [2XTwoCohomology[102X  46.8-3
  [10XTwoGroup[110X library  50.7
  [2XTwoSidedIdeal[102X  56.2-1
  [2XTwoSidedIdealByGenerators[102X  56.2-4
  [2XTwoSidedIdealNC[102X  56.2-2
  [2XTwoSquares[102X  15.7-1
  type, boolean  20.
  type, cyclotomic  18.
  type, records  29.
  type, strings  27.1
  [2XTypeObj[102X  13.9-1
  [2XTypeOfDefaultGeneralMapping[102X  32.14-7
  [2XTzEliminate[102X (for a presentation (and a generator))  48.7-1
  [2XTzEliminate[102X (for a presentation (and an integer))  48.7-1
  [2XTzFindCyclicJoins[102X  48.7-4
  [2XTzGo[102X  48.6-1
  [2XTzGoGo[102X  48.6-3
  [2XTzImagesOldGens[102X  48.9-3
  [2XTzInitGeneratorImages[102X  48.9-1
  [2XTzNewGenerator[102X  48.5-2
  [2XTzOptions[102X  48.11-1
  [2XTzPreImagesNewGens[102X  48.9-4
  [2XTzPrint[102X  48.4-6
  [2XTzPrintGeneratorImages[102X  48.9-5
  [2XTzPrintGenerators[102X  48.4-1
  [2XTzPrintLengths[102X  48.4-3
  [2XTzPrintOptions[102X  48.11-2
  [2XTzPrintPairs[102X  48.4-7
  [2XTzPrintPresentation[102X  48.4-5
  [2XTzPrintRelators[102X  48.4-2
  [2XTzPrintStatus[102X  48.4-4
  [2XTzSearch[102X  48.7-2
  [2XTzSearchEqual[102X  48.7-3
  [2XTzSort[102X  48.1-2
  [2XTzSubstitute[102X (for a presentation (and an integer and 0/1/2))  48.8-1
  [2XTzSubstitute[102X (for a presentation and a word)  48.8-1
  [2XTzSubstituteCyclicJoins[102X  48.8-2
  [22Xu_N[122X (irrational value)  18.4-3
  [2XUglyVector[102X  61.11-2
  [2XUnbind[102X (for multiple indices)  21.5-2
  [2XUnbind[102X (unbind a list entry)  21.5-2
  [2XUnbind[102X (unbind a record component)  29.6-2
  [2XUnbind[102X (unbind a variable)  4.8-2
  [2XUnbind\.[102X  29.7-3
  [2XUnbind\[\][102X  21.2-1
  [2XUnbindElmWPObj[102X  86.2-1
  [2XUnbindGlobal[102X  4.9-6
  [2XUncoverageLineByLine[102X  7.7-17
  [2XUnderlyingCharacteristic[102X (for a character table)  71.9-5
  [2XUnderlyingCharacteristic[102X (for a character)  71.9-5
  [2XUnderlyingCharacterTable[102X  72.2-1
  [2XUnderlyingElement[102X (fp group elements)  47.4-4
  [2XUnderlyingElement[102X (fp semigroup elements)  52.4-1
  [2XUnderlyingExternalSet[102X  41.12-16
  [2XUnderlyingFamily[102X  64.1-4
  [2XUnderlyingGeneralMapping[102X  32.3-10
  [2XUnderlyingGroup[102X (for tables of marks)  70.7-7
  [2XUnderlyingGroup[102X (for character tables)  71.6-1
  [2XUnderlyingInjectionZeroMagma[102X  35.2-14
  [2XUnderlyingLeftModule[102X  61.6-2
  [2XUnderlyingLieAlgebra[102X  64.6-6
  [2XUnderlyingMagma[102X  65.1-6
  [2XUnderlyingRelation[102X  32.3-9
  [2XUnderlyingRingElement[102X  64.1-5
  [2XUnderlyingSemigroup[102X (for a Rees 0-matrix semigroup)  51.9-10
  [2XUnderlyingSemigroup[102X (for a Rees matrix semigroup)  51.9-10
  [2XUnInstallCharReadHookFunc[102X  10.10-2
  [2XUnion[102X (for a list)  30.5-3
  [2XUnion[102X (for various collections)  30.5-3
  union, of collections  30.5-3
  union, of sets  21.19-6
  [2XUnion2[102X  30.5-3
  [2XUnionBlist[102X (for a list)  22.3-1
  [2XUnionBlist[102X (for various boolean lists)  22.3-1
  [2XUnique[102X  21.20-4
  [2XUniteBlist[102X  22.4-1
  [2XUniteBlistList[102X  22.4-2
  [2XUniteSet[102X  21.19-6
  [2XUnits[102X  56.5-2
  [2XUnivariatenessTestRationalFunction[102X  66.5-7
  [2XUnivariatePolynomial[102X  66.5-1
  [2XUnivariatePolynomialByCoefficients[102X  66.5-2
  [2XUnivariatePolynomialRing[102X (for a ring (and a name and an exclusion list))  66.16-1
  [2XUnivariatePolynomialRing[102X (for a ring (and an indeterminate number))  66.16-1
  [2XUnivariateRationalFunctionByCoefficients[102X  66.14-1
  [2XUniversalEnvelopingAlgebra[102X  64.10-1
  UNIX, features  3.1
  UNIX, options  3.1
  [2XUNIXSelect[102X  10.2-3
  [2XUnknown[102X  74.1-1
  [2XUnloadSmallGroupsData[102X  50.7-9
  [2XUnorderedTuples[102X  16.2-6
  [2XUnprofileFunctions[102X  7.7-6
  [2XUnprofileLineByLine[102X  7.7-16
  [2XUnprofileMethods[102X  7.7-8
  [9Xuntil[109X  4.19
  [2XUntraceAllMethods[102X  7.3-4
  [2XUntraceImmediateMethods[102X  7.3-5
  [2XUntraceMethods[102X (for a list of operations)  7.3-3
  [2XUntraceMethods[102X (for operations)  7.3-3
  [2XUpdateMap[102X  73.5-7
  [2XUpEnv[102X  6.5-1
  [2XUpperCentralSeriesOfGroup[102X  39.17-12
  [2XUpperSubdiagonal[102X  24.12-2
  [2XUseBasis[102X  57.3-5
  [2XUseFactorRelation[102X  31.13-2
  [2XUseIsomorphismRelation[102X  31.13-3
  [2XUserPreference[102X  3.2-3
  [2XUseSubsetRelation[102X  31.13-1
  utilities for editing GAP files  6.11
  [22Xv_N[122X (irrational value)  18.4-3
  [2XValidatePackageInfo[102X  76.3-12
  [2XValuation[102X  68.1-3
  [2XValue[102X (for a univariate rat. function, a value (and a one))  66.7-1
  [2XValue[102X (for rat. function, a list of indeterminates, a value (and a one))  66.7-1
  [2XValueCochain[102X  64.12-4
  [2XValueGlobal[102X  4.9-4
  [2XValueMolienSeries[102X  72.12-3
  [2XValueOption[102X  8.1-5
  [2XValuePol[102X  23.7-1
  [2XValuesOfClassFunction[102X  72.2-2
  [2XVectorSpace[102X  61.2-1
  [2XVectorSpaceByPcgsOfElementaryAbelianGroup[102X  45.14-1
  [10Xvi[110X  6.11
  [2XView[102X  6.3-3
  [2XViewObj[102X (for a string)  27.1-4
  [2XViewObj[102X (for a ffe)  59.6-1
  [2XViewObj[102X  6.3-5
  [2XViewObj[102X (for a table of marks)  70.4-1
  [2XViewObj[102X (for a character table)  71.13-1
  [2XViewObj[102X (for class functions)  72.5-1
  [2XViewString[102X  27.7-3
  [10Xvim[110X  6.11
  virtual character  72.8-2
  virtual characters  72.
  [2XVirtualCharacter[102X (for a character table and a list)  72.6-2
  [2XVirtualCharacter[102X (for a group and a list)  72.6-2
  [22Xw_N[122X (irrational value)  18.4-3
  [2XWeakPointerObj[102X  86.1-1
  web sites, for GAP  1.5
  [2XWedgeGModule[102X  69.2-3
  [2XWeekDay[102X  27.10-5
  [2XWeightLexOrdering[102X  34.4-8
  [2XWeightOfGenerators[102X  34.4-10
  [2XWeightsTom[102X  70.7-12
  [2XWeightVecFFE[102X  23.6-1
  [2XWeylGroup[102X  64.7-3
  [2XWeylOrbitIterator[102X  64.7-7
  [2XWhere[102X  6.4-5
  [9Xwhile[109X loop  4.18
  [2XWordAlp[102X  27.7-10
  words, in generators  39.5
  Wreath product embedding  49.4-4
  [2XWreathProduct[102X  49.4-1
  [2XWreathProductImprimitiveAction[102X  49.4-2
  [2XWreathProductOrdering[102X  34.4-13
  [2XWreathProductProductAction[102X  49.4-3
  [2XWriteAll[102X  10.4-3
  [2XWriteByte[102X  10.4-1
  [2XWriteGapIniFile[102X  3.2-3
  [2XWriteLine[102X  10.4-2
  [2XX[102X (for a family and a number)  66.1-1
  [2XX[102X (for a ring (and a name, and an exclusion list))  66.1-1
  [2XX[102X (for a ring (and a number))  66.1-1
  [22Xx_N[122X (irrational value)  18.4-3
  [22Xy_N[122X (irrational value)  18.4-3
  [2XZ[102X (for field size)  59.1-2
  [2XZ[102X (for prime and degree)  59.1-2
  [2XZClassRepsQClass[102X  44.6-9
  [2XZero[102X  31.10-3
  [2XZero[102X (for a partial perm)  54.3-23
  [2XZeroAttr[102X  31.10-3
  [2XZeroCoefficient[102X  65.2-5
  [2XZeroCoefficientRatFun[102X  66.21-4
  [2XZeroImmutable[102X  31.10-3
  [2XZeroMapping[102X  32.2-8
  [2XZeroMutable[102X  31.10-3
  [2XZeroOp[102X  31.10-3
  [2XZeroSameMutability[102X  31.10-3
  [2XZeroSM[102X  31.10-3
  [2XZeta[102X  19.2-1
  [2XZippedProduct[102X  66.23-2
  [2XZippedSum[102X  66.23-1
  [2XZmodnZ[102X  14.5-2
  [2XZmodnZObj[102X (for a residue class family and integer)  14.5-3
  [2XZmodnZObj[102X (for two integers)  14.5-3
  [2XZmodpZ[102X  14.5-2
  [2XZmodpZNC[102X  14.5-2
  [2XZumbroichBase[102X  60.3-1
  [2XZuppos[102X  39.20-8
  
  
  -------------------------------------------------------
