The GAP 4 Manual - Full Index I

_ A B C D E F G H I J K L M N O P Q R S T U V W X Y Z

i_N R 18.4

Ideal R 54.2.1

IdealByGenerators R 54.2.4

IdealNC R 54.2.2

Ideals R 60.6

Ideals in Rings R 54.2

Ideals of semigroups R 49.2

Idempotents R 33.4.6

IdempotentsTom R 68.7.8

IdempotentsTomInfo R 68.7.8

Identical Lists R 21.6

Identical Lists T 3.2

Identical Objects R 12.5

Identical Records R 27.3

IdentificationOfConjugacyClasses R 69.6.3

Identifier, for character tables R 69.8.11

Identifier, for tables of marks R 68.7.9

identifier T 2.4

Identifiers R 4.6

Identity R 30.10.2

IdentityBinaryRelation R 32.1.3

IdentityFromSCTable R 60.3.6

IdentityMapping R 31.1.9

IdentityMat R 24.4.1

IdentityTransformation R 52.0

IdFunc R 5.3.4

IdGap3SolvableGroup R 48.7.7

IdGroup R 48.7.5

IdSmallGroup R 48.7.5

IdsOfAllSmallGroups R 48.7.6

If R 4.16

if statement R 4.16.1

If Statements T 4.2

If Things Go Wrong R 73.19

Image R 31.3.6

Image, for Frobenius automorphisms R 57.4

image, vector under matrix R 24.2.10

ImageElm R 31.3.5

ImageElt N 3.2.3

ImageGroup N 4.3.4

ImageListOfTransformation R 52.0

Images R 31.3.7

Images under Mappings R 31.3

ImagesElm R 31.3.3

ImageSetOfTransformation R 52.0

ImagesRepresentative R 31.3.2

ImagesSet R 31.3.4

ImagesSmallestGenerators R 38.3.1

ImagesSource R 31.3.1

ImagesSource N 3.2.7

ImfInvariants R 48.11.3

ImfMatrixGroup R 48.11.4

ImfNumberQClasses R 48.11.1

ImfNumberQQClasses R 48.11.1

ImfNumberZClasses R 48.11.1

Immediate and True Methods T 8.3

Immediate Methods P 2.6

Immutability T 3.3

Immutable R 12.6.3

Immutable Objects T 9.6

ImmutableBasis R 59.7.4

ImmutableMatrix R 24.13.1

Implementing New List Objects P 3.11

in, operation for R 28.5.1

in, for lists R 21.8

in, for strictly sorted lists R 21.19.1

in, for collections R 28.5.1

In Parent Attributes E 6.2

IndependentGeneratorsOfAbelianGroup R 37.21.5

Indeterminate R 64.1.1

IndeterminateName R 64.1.4

Indeterminateness R 71.3.13

IndeterminateNumberOfLaurentPolynomial R 64.12.3

IndeterminateNumberOfUnivariateRationalFunction R 64.1.2

IndeterminateOfUnivariateRationalFunction R 64.1.3

Indeterminates R 64.1

IndeterminatesOfPolynomialRing R 64.14.2

Index R 37.3.2

indexing commands E 2.5

IndexInWholeGroup R 37.3.3

IndexNC R 37.3.2

Indicator R 69.10.4

IndicatorOp R 69.10.4

IndicesInvolutaryGenerators R 45.5.9

IndicesNormalSteps R 43.11.9

IndicesOfAdjointBasis R 60.8.6

IndicesStabChain R 41.9.7

Indirected R 71.3.4

Induced Actions R 67.6

InducedAutomorphism R 38.7.6

InducedClassFunction R 70.9.3

InducedClassFunctions R 70.9.4

InducedCyclic R 70.9.5

InducedPcgs R 43.7.4

InducedPcgsByGenerators R 43.7.5

InducedPcgsByGeneratorsNC R 43.7.5

InducedPcgsByPcSequence R 43.7.2

InducedPcgsByPcSequenceAndGenerators R 43.7.6

InducedPcgsByPcSequenceNC R 43.7.2

InducedPcgsWrtFamilyPcgs R 44.1.3

InducedPcgsWrtSpecialPcgs R 43.13.8

Inequalities R 70.14.5

inequality, of records R 27.4.1

inequality test R 4.11.1

InertiaSubgroup R 70.8.13

Infinity R 18.2

infinity R 18.2.1

inflated class functions R 70.9

Info R 7.4.5

Info Functions R 7.4

InfoAlgebra R 60.0

InfoAttributes R 13.6.4

InfoBckt R 41.11.4

InfoCharacterTable R 69.4.2

InfoCoh R 37.22.5

InfoComplement R 37.10.7

InfoCoset R 37.8.6

InfoFpGroup R 45.0

InfoGroup R 37.2.7

InfoLattice R 37.19.8

InfoLevel R 7.4.4

InfoMatrix R 24.0

InfoMonomial R 72.0

InfoNumtheor R 15.0

InfoOptions R 8.0

InfoPcSubgroup R 37.20.6

Information about a function R 5.1

Information about the version used R 7.8

InfoText R 69.8.12

InfoTom R 68.6.1

InfoWarning R 7.4.6

init.g, for a GAP package E 4.2 E 4.9

InitFusion R 71.5.1

InitPowerMap R 71.4.1

Injection N 4.4.2

InjectionZeroMagma R 33.2.12

inner product, of group characters R 70.8

InnerAutomorphism R 38.6.3

InnerAutomorphismNC R 38.6.3

InnerAutomorphismsAutomorphismGroup R 38.7.5

InParentFOA E 6.2.1

Input-Output Streams R 10.8

InputLogTo R 9.7.7

InputLogTo, for streams R 10.4.6

InputLogTo, stop logging input R 9.7.8

InputOutputLocalProcess R 10.8.2

InputTextFile R 10.5.1

InputTextNone R 10.9.1

InputTextString R 10.7.1

InputTextUser R 10.6.1

InsertTrivialStabilizer R 41.10.8

InstallAtExit R 6.7.2

installation, under Windows R 73.10

installation R 73.0

installation, under UNIX R 73.4

Installation for the Impatient R 73.1

Installation of GAP for MacOS R 73.14

Installation of GAP for UNIX R 73.4

Installation of GAP for Windows R 73.10

Installation of GAP Package Binaries E 4.5

InstallCharReadHookFunc R 10.10.1

InstalledPackageVersion R 74.4.5

InstallFactorMaintenance R 30.13.6

InstallFlushableValue P 3.15.6

InstallGlobalFunction P 3.15.4

InstallHandlingByNiceBasis R 59.11.1

InstallImmediateMethod P 2.6.1

Installing a GAP Package in your home directory R 74.2

Installing a Help Book E 5.1

Installing GAP R 73.0

Installing GAP Packages R 74.1

InstallIsomorphismMaintenance R 30.13.5

InstallMethod P 2.2.1

InstallOtherMethod P 2.2.2

InstallSubsetMaintenance R 30.13.4

InstallTrueMethod P 2.7.1

InstallValue P 3.15.6

Int, for strings R 26.6.1

Int R 14.1.3

Int, for cyclotomics R 18.1

integer part of a quotient R 14.2

Integers R 14.0 R 14.0

Integral Bases for Abelian Number Fields R 58.1

Integral matrices and lattices R 25.0

IntegralizedMat R 25.2.4

IntegratedStraightLineProgram R 35.8.8

Interface to the CAS System R 69.20

Interface to the GAP Help System E 5.0

Interface to the MOC System R 69.21

IntermediateGroup R 37.16.17

IntermediateSubgroups R 37.16.18

Internally Represented Cyclotomics R 18.6

Internally Represented Strings R 26.2

InterpolatedPolynomial R 54.7.9

IntersectBlist R 22.3.3

Intersection R 28.4.2

Intersection, for groups with pcgs R 43.16

intersection, of sets R 21.19

intersection, of collections R 28.4

Intersection2 R 28.4.2

IntersectionBlist R 22.2.2

IntersectionsTom R 68.9.10

IntersectSet R 21.19.7

IntFFE R 57.2.3

IntHexString R 26.6.1

Introducing new Viewer for the Online Help E 5.4

IntScalarProducts R 71.3.15 R 71.3

IntVecFFE R 57.2.4

Invariant Forms R 42.4

InvariantBilinearForm R 42.4.1

InvariantElementaryAbelianSeries R 37.16.10

InvariantLattice R 42.5.6

InvariantQuadraticForm R 42.4.5

InvariantSesquilinearForm R 42.4.3

InvariantSubgroupsElementaryAbelianGroup R 37.20.2

inverse, of class function R 70.4

Inverse R 30.10.8

Inverse, group homomorphism R 38.2

inverse, matrix R 24.2.8

InverseAttr R 30.10.8

InverseClasses R 69.8.13

InverseGeneralMapping R 31.1.3

InverseImmutable R 30.10.8

InverseMap R 71.3.2

InverseMatMod R 24.13.5

InverseMutable R 30.10.8

InverseOp R 30.10.8

InverseRepresentative R 41.9.10

InverseSameMutability R 30.10.8

InverseSM R 30.10.8

Invoking the Help R 2.1

IRIX R 73.3

Irr R 69.8.2

irrationalities R 18.0

IrrBaumClausen R 69.12.3

IrrConlon R 69.12.2

IrrDixonSchneider R 69.12.1

Irreducibility Tests R 67.4

irreducible character R 70.8

irreducible characters, computation R 69.14

Irreducible Maximal Finite Integral Matrix Groups R 48.11

Irreducible Solvable Matrix Groups R 48.10

IrreducibleDifferences R 70.10.3

IrreducibleModules, for groups with pcgs R 43.16

IrreducibleRepresentations R 69.12.4

IrreducibleRepresentationsDixon R 69.12.5

IrreducibleSolvableGroup R 48.10.6

IrreducibleSolvableGroupMS R 48.10.1

Is16BitsFamily R 35.6.7

Is32BitsFamily R 35.6.7

Is8BitsFamily R 35.6.7

IsAbelian R 33.4.9

IsAbelian, for character tables R 69.8

IsAbelianNumberField R 58.2.2

IsAbelianNumberFieldPolynomialRing R 64.14.6

IsAbelianTom R 68.8.1

IsAdditiveElement R 30.14.3

IsAdditiveElementWithInverse R 30.14.7

IsAdditiveElementWithZero R 30.14.5

IsAdditiveGroup R 53.1.6

IsAdditiveGroupGeneralMapping R 31.9.4

IsAdditiveGroupHomomorphism R 31.9.4

IsAdditivelyCommutative R 53.3.1

IsAdditivelyCommutativeElement R 30.15.2

IsAdditivelyCommutativeElementCollColl R 30.15.2

IsAdditivelyCommutativeElementCollection R 30.15.2

IsAdditivelyCommutativeElementFamily R 30.15.2

IsAdditiveMagma R 53.1.4

IsAdditiveMagmaWithInverses R 53.1.6

IsAdditiveMagmaWithZero R 53.1.5

IsAlgebra R 60.7.3

IsAlgebraGeneralMapping R 31.11.3

IsAlgebraHomomorphism R 31.11.3

IsAlgebraicElement R 65.2.1

IsAlgebraicExtension R 65.1.2

IsAlgebraModuleElement R 60.10.8

IsAlgebraModuleElementCollection R 60.10.8

IsAlgebraModuleElementFamily R 60.10.8

IsAlgebraWithOne R 60.7.4

IsAlgebraWithOneGeneralMapping R 31.11.4

IsAlgebraWithOneHomomorphism R 31.11.4

IsAlphaChar R 26.3.4

IsAlternatingGroup R 41.3.4

IsAnticommutative R 54.4.6

IsAntisymmetricBinaryRelation R 32.2.4

IsAssociated R 54.5.3

IsAssociative R 33.4.7

IsAssociativeElement R 30.15.1

IsAssociativeElementCollColl R 30.15.1

IsAssociativeElementCollection R 30.15.1

IsAssocWord R 35.1.1

IsAssocWordWithInverse R 35.1.1

IsAssocWordWithOne R 35.1.1

IsAttributeStoringRep P 4.5 P 4.6

IsAutomorphismGroup R 38.7.4

IsBasicWreathLessThanOrEqual R 35.3.4

IsBasicWreathProductOrdering R 29.3.12

IsBasis R 59.4.1

IsBasisByNiceBasis R 59.10.5

IsBasisOfAlgebraModuleElementSpace R 60.10.14

IsBergerCondition R 72.1.3

IsBijection T 9.4

IsBijective R 31.2.6

IsBinaryRelation R 32.1.1

IsBinaryRelation, same as IsEndoGeneralMapping R 32.0

IsBLetterAssocWordRep R 35.6.3

IsBLetterWordsFamily R 35.6.4

IsBlist R 22.0

IsBlockMatrixRep R 24.14

IsBool R 20.0

IsBound, for lists R 21.5.1

IsBound and Unbind for Lists R 21.5

IsBound and Unbind for Records R 27.5

IsBOundElmWPObj E 7.3.1

IsBoundGlobal R 4.9.5

IsBrauerTable R 69.4.1

IsBravaisGroup R 42.5.10

IsBuiltFromAdditiveMagmaWithInverses R 36.3.1

IsBuiltFromGroup R 36.3.6

IsBuiltFromMagma R 36.3.2

IsBuiltFromMagmaWithInverses R 36.3.4

IsBuiltFromMagmaWithOne R 36.3.3

IsBuiltFromSemigroup R 36.3.5

IsCanonicalBasis R 59.6.1

IsCanonicalBasisFullMatrixModule R 59.8.10

IsCanonicalBasisFullRowModule R 59.8.9

IsCanonicalNiceMonomorphism R 38.5.4

IsCanonicalPcgs R 43.8.1

IsCentral R 33.4.8

IsChainTypeGroup N 5.0

IsChar R 26.0

IsCharacter R 70.8.1

IsCharacteristicSubgroup R 37.3.7

IsCharacterTable R 69.4.1

IsCharacterTableInProgress R 69.4.1

IsCharCollection R 26.0

IsClassFunction R 70.0

IsClassFusionOfNormalSubgroup R 69.10.3

IsClosedStream R 10.1.2

IsCochain R 61.12.2

IsCochainCollection R 61.12.2

IsCollection R 28.0

IsCollectionFamily R 28.1.2

IsCommutative R 33.4.9

IsCommutativeElement R 30.15.3

IsCommutativeElementCollColl R 30.15.3

IsCommutativeElementCollection R 30.15.3

IsComponentObjectRep P 4.6

IsCompositionMappingRep R 31.1.6

IsConfluent, for pc groups R 44.4.7

IsConfluent R 36.1.5

IsConjugacyClassSubgroupsByStabilizerRep R 37.18.2

IsConjugacyClassSubgroupsRep R 37.18.2

IsConjugate R 37.9.9

IsConjugatorAutomorphism R 38.6.4

IsConjugatorIsomorphism R 38.6.4

IsConstantRationalFunction R 64.4.11

IsConstantTimeAccessGeneralMapping R 31.12.2

IsConstantTimeAccessList R 21.1.5

IsContainedInSpan R 59.7.5

IsCopyable R 12.6.1

IsCyc R 18.1.3

IsCyclic R 37.14.1

IsCyclic, for character tables R 69.8

IsCyclicTom R 68.8.1

IsCyclotomic R 18.1.3

IsCyclotomicMatrixGroup R 42.5.1

IsDenseList R 21.1.2

IsDiagonalMat R 24.3.8

IsDictionary N 2.1.1

IsDigitChar R 26.3.1

IsDirectoryPath R 9.6.5

IsDistributive R 54.4.5

IsDivisionRing R 56.1.1

IsDomain R 30.9.1

IsDoneIterator R 28.7.4

IsDoubleCoset R 37.8.4

IsDuplicateFree R 21.17.2

IsDuplicateFreeList R 21.17.2

IsDxLargeGroup R 69.14.8

IsElementaryAbelian R 37.14.2

IsElementOfFpMonoid R 51.0

IsElementOfFpSemigroup R 51.0

IsElementOfFreeMagmaRing R 63.2.1

IsElementOfFreeMagmaRingCollection R 63.2.1

IsElementOfFreeMagmaRingFamily R 63.2.2

IsElementOfMagmaRingModuloRelations R 63.4.1

IsElementOfMagmaRingModuloRelationsCollection R 63.4.1

IsElementOfMagmaRingModuloRelationsFamily R 63.4.2

IsElementOfMagmaRingModuloSpanOfZeroFamily R 63.5.1

IsEmpty R 28.3.1

IsEmptyString R 26.2.3

IsEndOfStream R 10.3.7

IsEndoGeneralMapping, same as IsBinaryRelation R 32.0

IsEndoGeneralMapping R 31.12.3

IsEqualSet R 21.19.2

IsEquivalenceClass R 32.7.1

IsEquivalenceRelation R 32.2.8

IsEuclideanRing R 54.6.1

IsEvenInt R 14.1.4

IsExecutableFile R 9.6.4

IsExistingFile R 9.6.1

IsExtAElement R 30.14.1

IsExternalOrbit R 39.11.8

IsExternalSet R 39.11.1

IsExternalSubset R 39.11.6

IsExtLElement R 30.14.8

IsExtRElement R 30.14.9

IsFamilyPcgs R 44.1.2

IsFFE R 57.1.1

IsFFECollColl R 57.1.1

IsFFECollection R 57.1.1

IsField R 56.1.2

IsFieldControlledByGaloisGroup R 56.3

IsFieldHomomorphism R 31.11.5

IsFinite R 28.3.2

IsFinite, for character tables R 69.8

IsFiniteDimensional R 55.3.5

IsFiniteDimensional, for matrix algebras R 60.7.7

IsFiniteFieldPolynomialRing R 64.14.5

IsFinitelyGeneratedGroup R 37.14.12

IsFiniteOrderElement R 30.15.4

IsFiniteOrderElementCollColl R 30.15.4

IsFiniteOrderElementCollection R 30.15.4

IsFiniteOrdersPcgs R 43.4.2

IsFixedStabilizer R 41.10.9

IsFLMLOR R 60.7.1

IsFLMLORWithOne R 60.7.2

IsFpGroup R 45.0

IsFpMonoid R 51.0

IsFpSemigroup R 51.0

IsFreeGroup R 35.2.2

IsFreeLeftModule R 55.3.1

IsFreeMagmaRing R 63.1.3

IsFreeMagmaRingWithOne R 63.1.4

IsFromFpGroupGeneralMappingByImages R 38.10.9

IsFromFpGroupHomomorphismByImages R 38.10.9

IsFromFpGroupStdGensGeneralMappingByImages R 38.10.10

IsFromFpGroupStdGensHomomorphismByImages R 38.10.10

IsFullHomModule R 59.9.7

IsFullMatrixModule R 55.3.11

IsFullRowModule R 55.3.9

IsFullSubgroupGLorSLRespectingBilinearForm R 42.4.2

IsFullSubgroupGLorSLRespectingQuadraticForm R 42.4.6

IsFullSubgroupGLorSLRespectingSesquilinearForm R 42.4.4

IsFunc T 9.4

IsFunction R 5.4.1

IsGaussianIntegers R 58.4.2

IsGaussianRationals R 58.0

IsGaussianSpace R 59.8.3

IsGaussInt R 18.1.12

IsGaussRat R 18.1.13

IsGeneralizedDomain R 30.9.1

IsGeneralizedRowVector R 21.12.1

IsGeneralLinearGroup R 42.3.1

IsGeneralMapping R 31.12.1

IsGeneralMappingFamily R 31.13.2

IsGeneratorsOfStruct R 30.3.2

IsGL R 42.3.1

IsGreensClass R 49.5.3

IsGreensDClass R 49.5.3

IsGreensDRelation R 49.5.2

IsGreensHClass R 49.5.3

IsGreensHRelation R 49.5.2

IsGreensJClass R 49.5.3

IsGreensJRelation R 49.5.2

IsGreensLClass R 49.5.3

IsGreensLessThanOrEqual R 49.5.4

IsGreensLRelation R 49.5.2

IsGreensRClass R 49.5.3

IsGreensRelation R 49.5.2

IsGreensRRelation R 49.5.2

IsGroup R 37.2.6

IsGroupGeneralMapping R 31.8.4

IsGroupGeneralMappingByAsGroupGeneralMappingByImages R 38.10.2

IsGroupGeneralMappingByImages R 38.10.1

IsGroupGeneralMappingByPcgs R 38.10.6

IsGroupHClass R 49.5.11

IsGroupHomomorphism R 31.8.4

IsGroupOfAutomorphisms R 38.7.1

IsGroupRing R 63.1.5

IsHandledByNiceBasis R 55.3.13

IsHandledByNiceBasis, for vector spaces R 59.10.6

IsHandledByNiceMonomorphism R 38.5.1

IsHash N 2.3.1

IsHasseDiagram R 32.2.7

IsHomCoset N 3.0

IsHomCosetOfAdditiveElt N 3.0

IsHomCosetOfFp N 3.0

IsHomCosetOfMatrix N 3.0

IsHomCosetOfPerm N 3.0

IsHomCosetOfTuple N 3.0

IsHomCosetToAdditiveElt N 3.0

IsHomCosetToAdditiveEltRep N 3.0

IsHomCosetToFp N 3.0

IsHomCosetToFpRep N 3.0

IsHomCosetToMatrix N 3.0

IsHomCosetToMatrixRep N 3.0

IsHomCosetToObjectRep N 3.0

IsHomCosetToPerm N 3.0

IsHomCosetToPermRep N 3.0

IsHomCosetToTuple N 3.0

IsHomCosetToTupleRep N 3.0

IsHomogeneousList R 21.1.3

IsIdempotent R 30.10.7

IsIdenticalObj R 12.5.1

IsIdenticalObj T 2.5

IsInChain N 5.0

IsIncomparableUnder R 29.2.3

IsInducedFromNormalSubgroup R 72.2.4

IsInducedPcgs R 43.7.1

IsInducedPcgsWrtSpecialPcgs R 43.13.7

IsInfBitsFamily R 35.6.7

IsInfinity R 18.2.1

IsInjective R 31.2.4

IsInnerAutomorphism R 38.6.4

IsInputOutputStream R 10.8.1

IsInputStream R 10.1.3

IsInputTextNone R 10.1.5

IsInputTextStream R 10.1.4

IsInt R 14.1.1

IsIntegerMatrixGroup R 42.5.3

IsIntegers R 14.0

IsIntegralBasis R 59.6.2

IsIntegralCyclotomic R 18.1.4

IsIntegralRing R 54.4.1

IsInternallyConsistent, for tables of marks R 68.9.1

IsInternallyConsistent, for character tables R 69.10.1

IsInternallyConsistent R 12.8.3

IsIrreducibleCharacter R 70.8.3

IsIrreducibleRingElement R 54.5.6

IsIterator R 28.7.3

IsJacobianElement R 30.15.5

IsJacobianElementCollColl R 30.15.5

IsJacobianElementCollection R 30.15.5

IsJacobianRing R 54.4.8

IsLaurentPolynomial R 64.4.10

IsLaurentPolynomialDefaultRep R 64.19.7

IsLDistributive R 54.4.3

IsLeftAlgebraModuleElement R 60.10.9

IsLeftAlgebraModuleElementCollection R 60.10.9

IsLeftIdeal R 54.2.3

IsLeftIdealInParent R 54.2.3

IsLeftModule R 55.1.2

IsLeftModuleGeneralMapping R 31.10.2

IsLeftModuleHomomorphism R 31.10.2

IsLeftOperatorAdditiveGroup R 55.1.1

IsLeftSemigroupIdeal R 49.2.3

IsLeftSemigroupIdealEnumerator R 49.2.4

IsLeftVectorSpace R 59.0

IsLessThanOrEqualUnder R 29.2.8

IsLessThanUnder R 29.2.7

IsLetterAssocWordRep R 35.6.1

IsLetterWordsFamily R 35.6.2

IsLexicographicallyLess R 21.20.8

IsLieAbelian R 61.5.1

IsLieAlgebra R 60.7.5

IsLieMatrix R 24.1.3

IsLieNilpotent R 61.5.2

IsLieObject R 61.1.2

IsLieObjectCollection R 61.1.2

IsLieSolvable R 61.5.3

IsLinearMapping R 31.10.3

IsLinearMappingsModule R 59.9.9

IsList R 21.1.1

IsListDefault R 21.12.3

IsListOrCollection R 28.2.1

IsLookupDictionary N 2.1.2

IsLowerAlphaChar R 26.3.2

IsLowerTriangularMat R 24.3.10

IsMagma R 33.1.1

IsMagmaHomomorphism R 31.7.1

IsMagmaRingModuloRelations R 63.4.4

IsMagmaRingModuloSpanOfZero R 63.5.2

IsMagmaWithInverses R 33.1.4

IsMagmaWithInversesIfNonzero R 33.1.3

IsMagmaWithOne R 33.1.2

IsMapping R 31.2.3

IsMat T 9.4

IsMatchingSublist R 21.17.1

IsMatrix R 24.1.1

IsMatrixGroup R 42.0

IsMatrixModule R 55.3.8

IsMatrixSpace R 59.8.2

IsMinimalNonmonomial R 72.4.1

IsModuloPcgs R 43.9.2

IsMonoid R 50.0

IsMonomial, for groups R 72.3

IsMonomial, for characters R 72.3

IsMonomial, for character tables R 69.8

IsMonomial, for positive integers R 72.3

IsMonomialGroup R 37.14.9

IsMonomialMatrix R 24.3.7

IsMonomialNumber R 72.3.3

IsMultiplicativeElement R 30.14.10

IsMultiplicativeElementWithInverse R 30.14.13

IsMultiplicativeElementWithOne R 30.14.11

IsMultiplicativeElementWithZero R 30.14.12

IsMultiplicativeGeneralizedRowVector R 21.12.2

IsMultiplicativeZero R 33.4.12

IsMutable R 12.6.2

IsMutableBasis R 59.7.1

IsNaturalAlternatingGroup R 41.3.2

IsNaturalGL R 42.3.2

IsNaturalGLnZ R 42.5.4

IsNaturalSL R 42.3.4

IsNaturalSLnZ R 42.5.5

IsNaturalSymmetricGroup R 41.3.1

IsNearAdditiveElement R 30.14.2

IsNearAdditiveElementWithInverse R 30.14.6

IsNearAdditiveElementWithZero R 30.14.4

IsNearAdditiveGroup R 53.1.3

IsNearAdditiveMagma R 53.1.1

IsNearAdditiveMagmaWithInverses R 53.1.3

IsNearAdditiveMagmaWithZero R 53.1.2

IsNearlyCharacterTable R 69.4.1

IsNearRingElement R 30.14.15

IsNearRingElementWithInverse R 30.14.19

IsNearRingElementWithOne R 30.14.17

IsNegRat R 16.1.3

IsNilpotent, for character tables R 69.8

IsNilpotent, for groups with pcgs R 43.16

IsNilpotentElement R 61.9.5

IsNilpotentGroup R 37.14.3

IsNilpotentTom R 68.8.1

IsNonassocWord R 34.1.3

IsNonassocWordCollection R 34.1.4

IsNonassocWordWithOne R 34.1.3

IsNonassocWordWithOneCollection R 34.1.4

IsNonnegativeIntegers R 14.0

IsNonSPGeneralMapping R 31.13.1

IsNonTrivial R 28.3.4

IsNormal R 37.3.6

IsNormalBasis R 59.6.3

IsNotIdenticalObj R 12.5.2

IsNumberField R 58.2.1

IsObject R 12.1.1

IsOddInt R 14.1.5

isomorphic, pc group R 44.4 R 44.5

IsomorphicSubgroups R 38.9.3

IsomorphismFpAlgebra R 60.9.9

IsomorphismFpGroup R 45.10.1

IsomorphismFpGroup, for subgroups of fp groups R 45.11

IsomorphismFpGroupByGenerators R 45.10.2

IsomorphismFpGroupByGeneratorsNC R 45.10.2

IsomorphismFpGroupByPcgs R 44.3.2

IsomorphismFpSemigroup R 51.1.3

IsomorphismGroups R 38.9.1

IsomorphismMatrixAlgebra R 60.9.10

IsomorphismPcGroup R 44.5.2

IsomorphismPermGroup R 41.2.1

IsomorphismPermGroup, for Imf matrix groups R 48.11.5

IsomorphismPermGroupImfGroup R 48.11.6

IsomorphismReesMatrixSemigroup R 49.6.11

IsomorphismRefinedPcGroup R 44.4.8

IsomorphismRepStruct R 30.5.1

isomorphisms, find all R 38.9

Isomorphisms vs. Isomorphic Structures T 9.15

IsomorphismSCAlgebra R 60.9.11

IsomorphismSimplifiedFpGroup R 45.11.1

IsomorphismSpecialPcGroup R 44.5.3

IsomorphismTransformationSemigroup R 49.1.3

IsomorphismTypeInfoFiniteSimpleGroup R 37.14.11

IsOne R 30.10.5

IsOperation R 5.4.2

IsOrdering R 29.0

IsOrderingOnFamilyOfAssocWords R 29.3.1

IsOrdinaryMatrix R 24.1.2

IsOrdinaryTable R 69.4.1

IsOutputStream R 10.1.6

IsOutputTextNone R 10.1.8

IsOutputTextStream R 10.1.7

IsPadicExtensionNumber R 66.2.3

IsPadicExtensionNumberFamily R 66.2.4

IsParentPcgsFamilyPcgs R 44.1.4

IsPartialOrderBinaryRelation R 32.2.6

IsPcGroup R 44.3.1

IsPcGroupGeneralMappingByImages R 38.10.7

IsPcGroupHomomorphismByImages R 38.10.7

IsPcgs R 43.2.2

IsPcgsCentralSeries R 43.11.3

IsPcgsElementaryAbelianSeries R 43.11.1

IsPcgsPCentralSeriesPGroup R 43.11.5

IsPerfect, for character tables R 69.8

IsPerfectGroup R 37.14.5

IsPerfectTom R 68.8.1

IsPerm R 40.0

IsPermCollColl R 40.0

IsPermCollection R 40.0

IsPermGroup R 41.0

IsPermGroupGeneralMappingByImages R 38.10.4

IsPermGroupHomomorphismByImages R 38.10.4

IsPGroup R 37.14.14

IsPNilpotent R 37.14.19

IsPolycyclicGroup R 37.14.7

IsPolynomial R 64.4.4

IsPolynomialDefaultRep R 64.19.5

IsPolynomialRing R 64.14.4

IsPosInt R 14.1.2

IsPositiveIntegers R 14.0

IsPosRat R 16.1.2

IsPreimagesByAsGroupGeneralMappingByImages R 38.10.3

IsPreOrderBinaryRelation R 32.2.5

IsPrime R 54.5.7

IsPrimeField R 56.2.5

IsPrimeInt R 14.3.2

IsPrimeOrdersPcgs R 43.4.3

IsPrimePowerInt R 14.3.3

IsPrimitive R 39.9.7

IsPrimitiveCharacter R 72.2.2

IsPrimitivePolynomial R 64.4.12

IsPrimitiveRootMod R 15.2.4

IsProbablyPrimeInt R 14.3.2

IsPseudoCanonicalBasisFullHomModule R 59.9.8

IsPSolvable R 37.14.18

IsPSolvableCharacterTable R 69.10.2

IsPSolvableCharacterTableOp R 69.10.2

IsPurePadicNumber R 66.1.5

IsPurePadicNumberFamily R 66.1.6

IsQuasiPrimitive R 72.2.3

IsQuaternion R 60.7.8

IsQuaternionCollColl R 60.7.8

IsQuaternionCollection R 60.7.8

IsQuickPositionList R 21.23.1

IsQuotientSemigroup R 49.4.1

IsRange R 21.22.1

IsRat R 16.1.1

IsRationalFunction R 64.4.1

IsRationalFunctionDefaultRep R 64.19.1

IsRationalFunctionsFamily R 64.17.2

IsRationalMatrixGroup R 42.5.2

IsRationals R 16.0

IsRationalsPolynomialRing R 64.14.7

IsRDistributive R 54.4.4

IsReadableFile R 9.6.2

IsReadOnlyGlobal R 4.9.1

IsRec T 9.4

IsRecord R 27.0

IsRecordCollColl R 27.0

IsRecordCollection R 27.0

IsReduced R 36.1.7

IsReductionOrdering R 29.3.3

IsReesCongruence R 49.3.2

IsReesCongruenceSemigroup R 49.0

IsReesMatrixSemigroup R 49.6.3

IsReesMatrixSemigroupElement R 49.6.6

IsReesZeroMatrixSemigroup R 49.6.4

IsReesZeroMatrixSemigroupElement R 49.6.6

IsReflexiveBinaryRelation R 32.2.1

IsRegular R 39.9.5

IsRegularDClass R 49.5.12

IsRegularSemigroup R 49.0

IsRegularSemigroupElement R 49.0

IsRelativelySM R 72.3.6

IsRestrictedLieAlgebra R 61.8.1

IsRewritingSystem R 36.1.1

IsRightAlgebraModuleElement R 60.10.10

IsRightAlgebraModuleElementCollection R 60.10.10

IsRightCoset R 37.6.4

IsRightIdeal R 54.2.3

IsRightIdealInParent R 54.2.3

IsRightModule R 55.1.7

IsRightOperatorAdditiveGroup R 55.1.6

IsRightSemigroupIdeal R 49.2.3

IsRightSemigroupIdealEnumerator R 49.2.4

IsRing R 54.1.1

IsRingElement R 30.14.16

IsRingElementWithInverse R 30.14.20

IsRingElementWithOne R 30.14.18

IsRingGeneralMapping R 31.11.1

IsRingHomomorphism R 31.11.1

IsRingWithOne R 54.3.1

IsRingWithOneGeneralMapping R 31.11.2

IsRingWithOneHomomorphism R 31.11.2

IsRootSystem R 61.7.3

IsRootSystemFromLieAlgebra R 61.7.4

IsRowModule R 55.3.7

IsRowSpace R 59.8.1

IsRowVector R 23.0

IsScalar R 30.14.20

IsSemiEchelonized R 59.8.7

IsSemigroup R 49.0

IsSemigroupCongruence R 49.3.1

IsSemigroupIdeal R 49.2.3

IsSemigroupIdealEnumerator R 49.2.4

IsSemiRegular R 39.9.4

IsSet R 21.17.4

IsSet T 9.4

IsShortLexLessThanOrEqual R 35.3.3

IsShortLexOrdering R 29.3.7

IsSimple, for character tables R 69.8

IsSimpleAlgebra R 60.7.6

IsSimpleGroup R 37.14.10

IsSimpleSemigroup R 49.0

IsSingleValued R 31.2.2

IsSL R 42.3.3

IsSolvable, for character tables R 69.8

IsSolvableGroup R 37.14.6

IsSolvableTom R 68.8.1

IsSortedList R 21.17.3

IsSpecialLinearGroup R 42.3.3

IsSpecialPcgs R 43.13.1

IsSPGeneralMapping R 31.13.1

IsSSortedList R 21.17.4

IsStandardGeneratorsOfGroup R 68.10.4

IsStraightLineProgElm R 35.9.1

IsStraightLineProgram R 35.8.1

IsStream R 10.1.1

IsString R 26.0

IsStringRep R 26.2.1

IsStruct R 30.6.1

IsSubgroup R 37.3.5

IsSubgroupFpGroup R 45.0

IsSubgroupOfWholeGroupByQuotientRep R 45.12.2

IsSubgroupSL R 42.3.5

IsSubmonoidFpMonoid R 51.0

IsSubnormal R 37.3.10

IsSubnormallyMonomial R 72.3.5

IsSubsemigroupFpSemigroup R 51.0

IsSubset R 28.4.1

IsSubsetBlist R 22.1.4

IsSubsetLocallyFiniteGroup R 37.14.13

IsSubsetSet R 21.19.3

IsSubspacesVectorSpace R 59.3.2

IsSubstruct R 30.8.4

IsSupersolvable, for character tables R 69.8

IsSupersolvable, for groups with pcgs R 43.16

IsSupersolvableGroup R 37.14.8

IsSurjective R 31.2.5

IsSyllableAssocWordRep R 35.6.5

IsSyllableWordsFamily R 35.6.6

IsSymmetricBinaryRelation R 32.2.2

IsSymmetricGroup R 41.3.3

IsTable R 21.1.4

IsTableOfMarks R 68.6.2

IsTableOfMarksWithGens R 68.11.3

IsToPcGroupGeneralMappingByImages R 38.10.8

IsToPcGroupHomomorphismByImages R 38.10.8

IsToPermGroupGeneralMappingByImages R 38.10.5

IsToPermGroupHomomorphismByImages R 38.10.5

IsTotal R 31.2.1

IsTotalOrdering R 29.2.2

IsTransformation R 52.0

IsTransformationCollection R 52.0

IsTransformationMonoid R 49.1.1

IsTransformationSemigroup R 49.1.1

IsTransitive, for class functions R 70.8

IsTransitive, for group actions R 39.9.1

IsTransitive, for characters R 70.8.15

IsTransitiveBinaryRelation R 32.2.3

IsTranslationInvariantOrdering R 29.3.2

IsTrivial R 28.3.3

IsTuple R 31.0

IsTwoSidedIdeal R 54.2.3

IsTwoSidedIdealInParent R 54.2.3

IsUEALatticeElement R 61.13.5

IsUEALatticeElementCollection R 61.13.5

IsUEALatticeElementFamily R 61.13.5

IsUniqueFactorizationRing R 54.4.2

IsUnit R 54.5.1

IsUnivariatePolynomial R 64.4.8

IsUnivariatePolynomialRing R 64.15.2

IsUnivariateRationalFunction R 64.4.6

IsUnknown R 19.0

IsUpperAlphaChar R 26.3.3

IsUpperTriangularMat R 24.3.9

IsValidIdentifier R 4.6.1

IsVector R 30.14.14

IsVectorSpace R 59.0

IsVirtualCharacter R 70.8.2

IsWeightLexOrdering R 29.3.9

IsWeightRepElement R 61.13.8

IsWeightRepElementCollection R 61.13.8

IsWeightRepElementFamily R 61.13.8

IsWellFoundedOrdering R 29.2.1

IsWeylGroup R 61.7.15

IsWholeFamily R 28.3.5

IsWLetterAssocWordRep R 35.6.3

IsWLetterWordsFamily R 35.6.4

IsWord R 34.1.1

IsWordCollection R 34.1.2

IsWordWithInverse R 34.1.1

IsWordWithOne R 34.1.1

IsWreathProductOrdering R 29.3.14

IsWritableFile R 9.6.3

IsZero R 30.10.6

IsZeroGroup R 49.0

IsZeroSimpleSemigroup R 49.0

IsZeroSquaredElement R 30.15.6

IsZeroSquaredElementCollColl R 30.15.6

IsZeroSquaredElementCollection R 30.15.6

IsZeroSquaredRing R 54.4.7

IsZmodnZObj R 14.4.4

IsZmodnZObjNonprime R 14.4.4

IsZmodpZObj R 14.4.4

IsZmodpZObjLarge R 14.4.4

IsZmodpZObjSmall R 14.4.4

Iterated R 21.20.24

Iterator R 28.7.1

IteratorByBasis R 59.5.6

IteratorList R 28.7.6

Iterators R 28.7

IteratorSorted R 28.7.2

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