<html><head><title>The GAP 4 Manual - Full Index I</title></head> <body bgcolor="ffffff"><h1>The GAP 4 Manual - Full Index I</h1> <p> <a href="theindex.htm">_</A> <a href="indxA.htm">A</A> <a href="indxB.htm">B</A> <a href="indxC.htm">C</A> <a href="indxD.htm">D</A> <a href="indxE.htm">E</A> <a href="indxF.htm">F</A> <a href="indxG.htm">G</A> <a href="indxH.htm">H</A> <a href="indxI.htm">I</A> <a href="indxJ.htm">J</A> <a href="indxK.htm">K</A> <a href="indxL.htm">L</A> <a href="indxM.htm">M</A> <a href="indxN.htm">N</A> <a href="indxO.htm">O</A> <a href="indxP.htm">P</A> <a href="indxQ.htm">Q</A> <a href="indxR.htm">R</A> <a href="indxS.htm">S</A> <a href="indxT.htm">T</A> <a href="indxU.htm">U</A> <a href="indxV.htm">V</A> <a href="indxW.htm">W</A> <a href="indxX.htm">X</A> <a href="indxY.htm">Y</A> <a href="indxZ.htm">Z</A> <dl> <dt>i_N <a href="ref/CHAP018.htm#I18">R 18.4</a> <dt>Ideal <a href="ref/CHAP054.htm#SSEC002.1">R 54.2.1</a> <dt>IdealByGenerators <a href="ref/CHAP054.htm#SSEC002.4">R 54.2.4</a> <dt>IdealNC <a href="ref/CHAP054.htm#SSEC002.2">R 54.2.2</a> <dt>Ideals <a href="ref/CHAP060.htm#SECT006">R 60.6</a> <dt>Ideals in Rings <a href="ref/CHAP054.htm#SECT002">R 54.2</a> <dt>Ideals of semigroups <a href="ref/CHAP049.htm#SECT002">R 49.2</a> <dt>Idempotents <a href="ref/CHAP033.htm#SSEC004.6">R 33.4.6</a> <dt>IdempotentsTom <a href="ref/CHAP068.htm#SSEC007.8">R 68.7.8</a> <dt>IdempotentsTomInfo <a href="ref/CHAP068.htm#SSEC007.8">R 68.7.8</a> <dt>Identical Lists <a href="ref/CHAP021.htm#SECT006">R 21.6</a> <dt>Identical Lists <a href="tut/CHAP003.htm#SECT002">T 3.2</a> <dt>Identical Objects <a href="ref/CHAP012.htm#SECT005">R 12.5</a> <dt>Identical Records <a href="ref/CHAP027.htm#SECT003">R 27.3</a> <dt>IdentificationOfConjugacyClasses <a href="ref/CHAP069.htm#SSEC006.3">R 69.6.3</a> <dt>Identifier, for character tables <a href="ref/CHAP069.htm#SSEC008.12">R 69.8.12</a> <dt>Identifier, for tables of marks <a href="ref/CHAP068.htm#SSEC007.9">R 68.7.9</a> <dt>identifier <a href="tut/CHAP002.htm#I15">T 2.5</a> <dt>Identifiers <a href="ref/CHAP004.htm#SECT006">R 4.6</a> <dt>Identity <a href="ref/CHAP030.htm#SSEC010.2">R 30.10.2</a> <dt>IdentityBinaryRelation <a href="ref/CHAP032.htm#SSEC001.3">R 32.1.3</a> <dt>IdentityFromSCTable <a href="ref/CHAP060.htm#SSEC003.6">R 60.3.6</a> <dt>IdentityMapping <a href="ref/CHAP031.htm#SSEC001.9">R 31.1.9</a> <dt>IdentityMat <a href="ref/CHAP024.htm#SSEC004.1">R 24.4.1</a> <dt>IdentityTransformation <a href="ref/CHAP052.htm#">R 52.0</a> <dt>IdFunc <a href="ref/CHAP005.htm#SSEC003.4">R 5.3.4</a> <dt>IdGap3SolvableGroup <a href="ref/CHAP048.htm#SSEC007.7">R 48.7.7</a> <dt>IdGroup <a href="ref/CHAP048.htm#SSEC007.5">R 48.7.5</a> <dt>IdSmallGroup <a href="ref/CHAP048.htm#SSEC007.5">R 48.7.5</a> <dt>IdsOfAllSmallGroups <a href="ref/CHAP048.htm#SSEC007.6">R 48.7.6</a> <dt>If <a href="ref/CHAP004.htm#SECT016">R 4.16</a> <dt>if statement <a href="ref/CHAP004.htm#SSEC016.1">R 4.16.1</a> <dt>If Statements <a href="tut/CHAP004.htm#SECT002">T 4.2</a> <dt>If Things Go Wrong <a href="ref/CHAP073.htm#SECT009">R 73.9</a> <dt>Image <a href="ref/CHAP031.htm#SSEC003.6">R 31.3.6</a> <dt>Image, for Frobenius automorphisms <a href="ref/CHAP057.htm#I4">R 57.4</a> <dt>image, vector under matrix <a href="ref/CHAP024.htm#SSEC002.10">R 24.2.10</a> <dt>ImageElm <a href="ref/CHAP031.htm#SSEC003.5">R 31.3.5</a> <dt>ImageElt <a href="new/CHAP003.htm#SSEC002.3">N 3.2.3</a> <dt>ImageGroup <a href="new/CHAP004.htm#SSEC003.4">N 4.3.4</a> <dt>ImageListOfTransformation <a href="ref/CHAP052.htm#">R 52.0</a> <dt>Images <a href="ref/CHAP031.htm#SSEC003.7">R 31.3.7</a> <dt>Images under Mappings <a href="ref/CHAP031.htm#SECT003">R 31.3</a> <dt>ImagesElm <a href="ref/CHAP031.htm#SSEC003.3">R 31.3.3</a> <dt>ImageSetOfTransformation <a href="ref/CHAP052.htm#">R 52.0</a> <dt>ImagesRepresentative <a href="ref/CHAP031.htm#SSEC003.2">R 31.3.2</a> <dt>ImagesSet <a href="ref/CHAP031.htm#SSEC003.4">R 31.3.4</a> <dt>ImagesSmallestGenerators <a href="ref/CHAP038.htm#SSEC003.1">R 38.3.1</a> <dt>ImagesSource <a href="ref/CHAP031.htm#SSEC003.1">R 31.3.1</a> <dt>ImagesSource <a href="new/CHAP003.htm#SSEC002.7">N 3.2.7</a> <dt>ImaginaryPart <a href="ref/CHAP018.htm#SSEC005.2">R 18.5.2</a> <dt>ImfInvariants <a href="ref/CHAP048.htm#SSEC012.3">R 48.12.3</a> <dt>ImfMatrixGroup <a href="ref/CHAP048.htm#SSEC012.4">R 48.12.4</a> <dt>ImfNumberQClasses <a href="ref/CHAP048.htm#SSEC012.1">R 48.12.1</a> <dt>ImfNumberQQClasses <a href="ref/CHAP048.htm#SSEC012.1">R 48.12.1</a> <dt>ImfNumberZClasses <a href="ref/CHAP048.htm#SSEC012.1">R 48.12.1</a> <dt>Immediate and True Methods <a href="tut/CHAP008.htm#SECT003">T 8.3</a> <dt>Immediate Methods <a href="prg/CHAP002.htm#SECT006">P 2.6</a> <dt>Immutability <a href="tut/CHAP003.htm#SECT003">T 3.3</a> <dt>Immutable <a href="ref/CHAP012.htm#SSEC006.3">R 12.6.3</a> <dt>Immutable Objects <a href="tut/CHAP009.htm#SECT006">T 9.6</a> <dt>ImmutableBasis <a href="ref/CHAP059.htm#SSEC007.4">R 59.7.4</a> <dt>ImmutableMatrix <a href="ref/CHAP024.htm#SSEC013.1">R 24.13.1</a> <dt>Implementing New List Objects <a href="prg/CHAP003.htm#SECT011">P 3.11</a> <dt>in, for collections <a href="ref/CHAP028.htm#SSEC005.1">R 28.5.1</a> <dt>in, for lists <a href="ref/CHAP021.htm#I5">R 21.8</a> <dt>in, for strictly sorted lists <a href="ref/CHAP021.htm#SSEC019.1">R 21.19.1</a> <dt>in, operation for <a href="ref/CHAP028.htm#SSEC005.1">R 28.5.1</a> <dt>In Parent Attributes <a href="ext/CHAP006.htm#SECT002">E 6.2</a> <dt>IndependentGeneratorsOfAbelianGroup <a href="ref/CHAP037.htm#SSEC022.5">R 37.22.5</a> <dt>Indeterminate <a href="ref/CHAP064.htm#SSEC001.1">R 64.1.1</a> <dt>IndeterminateName <a href="ref/CHAP064.htm#SSEC001.4">R 64.1.4</a> <dt>Indeterminateness <a href="ref/CHAP071.htm#SSEC003.13">R 71.3.13</a> <dt>IndeterminateNumberOfLaurentPolynomial <a href="ref/CHAP064.htm#SSEC012.3">R 64.12.3</a> <dt>IndeterminateNumberOfUnivariateRationalFunction <a href="ref/CHAP064.htm#SSEC001.2">R 64.1.2</a> <dt>IndeterminateOfUnivariateRationalFunction <a href="ref/CHAP064.htm#SSEC001.3">R 64.1.3</a> <dt>Indeterminates <a href="ref/CHAP064.htm#SECT001">R 64.1</a> <dt>IndeterminatesOfPolynomialRing <a href="ref/CHAP064.htm#SSEC014.2">R 64.14.2</a> <dt>Index <a href="ref/CHAP037.htm#SSEC003.2">R 37.3.2</a> <dt>Index numbers of primitive groups <a href="ref/CHAP048.htm#SECT010">R 48.10</a> <dt>indexing commands <a href="ext/CHAP002.htm#I36">E 2.5</a> <dt>IndexInWholeGroup <a href="ref/CHAP037.htm#SSEC003.3">R 37.3.3</a> <dt>IndexNC <a href="ref/CHAP037.htm#SSEC003.2">R 37.3.2</a> <dt>Indicator <a href="ref/CHAP069.htm#SSEC010.4">R 69.10.4</a> <dt>IndicatorOp <a href="ref/CHAP069.htm#SSEC010.4">R 69.10.4</a> <dt>IndicesCentralNormalSteps <a href="ref/CHAP043.htm#SSEC011.7">R 43.11.7</a> <dt>IndicesChiefNormalSteps <a href="ref/CHAP043.htm#SSEC011.15">R 43.11.15</a> <dt>IndicesEANormalSteps <a href="ref/CHAP043.htm#SSEC011.3">R 43.11.3</a> <dt>IndicesInvolutaryGenerators <a href="ref/CHAP045.htm#SSEC005.9">R 45.5.9</a> <dt>IndicesNormalSteps <a href="ref/CHAP043.htm#SSEC011.17">R 43.11.17</a> <dt>IndicesOfAdjointBasis <a href="ref/CHAP060.htm#SSEC008.6">R 60.8.6</a> <dt>IndicesPCentralNormalStepsPGroup <a href="ref/CHAP043.htm#SSEC011.11">R 43.11.11</a> <dt>IndicesStabChain <a href="ref/CHAP041.htm#SSEC009.7">R 41.9.7</a> <dt>Indirected <a href="ref/CHAP071.htm#SSEC003.4">R 71.3.4</a> <dt>Induced Actions <a href="ref/CHAP067.htm#SECT007">R 67.7</a> <dt>InducedAutomorphism <a href="ref/CHAP038.htm#SSEC007.6">R 38.7.6</a> <dt>InducedClassFunction <a href="ref/CHAP070.htm#SSEC009.3">R 70.9.3</a> <dt>InducedClassFunctions <a href="ref/CHAP070.htm#SSEC009.4">R 70.9.4</a> <dt>InducedClassFunctionsByFusionMap <a href="ref/CHAP070.htm#SSEC009.5">R 70.9.5</a> <dt>InducedCyclic <a href="ref/CHAP070.htm#SSEC009.6">R 70.9.6</a> <dt>InducedPcgs <a href="ref/CHAP043.htm#SSEC007.4">R 43.7.4</a> <dt>InducedPcgsByGenerators <a href="ref/CHAP043.htm#SSEC007.5">R 43.7.5</a> <dt>InducedPcgsByGeneratorsNC <a href="ref/CHAP043.htm#SSEC007.5">R 43.7.5</a> <dt>InducedPcgsByPcSequence <a href="ref/CHAP043.htm#SSEC007.2">R 43.7.2</a> <dt>InducedPcgsByPcSequenceAndGenerators <a href="ref/CHAP043.htm#SSEC007.6">R 43.7.6</a> <dt>InducedPcgsByPcSequenceNC <a href="ref/CHAP043.htm#SSEC007.2">R 43.7.2</a> <dt>InducedPcgsWrtFamilyPcgs <a href="ref/CHAP044.htm#SSEC001.3">R 44.1.3</a> <dt>InducedPcgsWrtSpecialPcgs <a href="ref/CHAP043.htm#SSEC013.8">R 43.13.8</a> <dt>Inequalities <a href="ref/CHAP070.htm#SSEC014.5">R 70.14.5</a> <dt>inequality, of records <a href="ref/CHAP027.htm#SSEC004.1">R 27.4.1</a> <dt>inequality test <a href="ref/CHAP004.htm#SSEC011.1">R 4.11.1</a> <dt>InertiaSubgroup <a href="ref/CHAP070.htm#SSEC008.13">R 70.8.13</a> <dt>Infinity <a href="ref/CHAP018.htm#SECT002">R 18.2</a> <dt>infinity <a href="ref/CHAP018.htm#SSEC002.1">R 18.2.1</a> <dt>inflated class functions <a href="ref/CHAP070.htm#I32">R 70.9</a> <dt>Info <a href="ref/CHAP007.htm#SSEC004.5">R 7.4.5</a> <dt>Info Functions <a href="ref/CHAP007.htm#SECT004">R 7.4</a> <dt>InfoAlgebra <a href="ref/CHAP060.htm#">R 60.0</a> <dt>InfoAttributes <a href="ref/CHAP013.htm#SSEC006.4">R 13.6.4</a> <dt>InfoBckt <a href="ref/CHAP041.htm#SSEC011.4">R 41.11.4</a> <dt>InfoCharacterTable <a href="ref/CHAP069.htm#SSEC004.2">R 69.4.2</a> <dt>InfoCoh <a href="ref/CHAP037.htm#SSEC023.5">R 37.23.5</a> <dt>InfoComplement <a href="ref/CHAP037.htm#SSEC011.7">R 37.11.7</a> <dt>InfoCoset <a href="ref/CHAP037.htm#SSEC009.6">R 37.9.6</a> <dt>InfoFpGroup <a href="ref/CHAP045.htm#">R 45.0</a> <dt>InfoGroebner <a href="ref/CHAP064.htm#SSEC017.4">R 64.17.4</a> <dt>InfoGroup <a href="ref/CHAP037.htm#SSEC002.7">R 37.2.7</a> <dt>InfoLattice <a href="ref/CHAP037.htm#SSEC020.8">R 37.20.8</a> <dt>InfoLevel <a href="ref/CHAP007.htm#SSEC004.4">R 7.4.4</a> <dt>InfoMatrix <a href="ref/CHAP024.htm#">R 24.0</a> <dt>InfoMonomial <a href="ref/CHAP072.htm#">R 72.0</a> <dt>InfoNumtheor <a href="ref/CHAP015.htm#">R 15.0</a> <dt>InfoOptions <a href="ref/CHAP008.htm#">R 8.0</a> <dt>InfoPcSubgroup <a href="ref/CHAP037.htm#SSEC021.6">R 37.21.6</a> <dt>Information about a function <a href="ref/CHAP005.htm#SECT001">R 5.1</a> <dt>Information about the version used <a href="ref/CHAP007.htm#SECT008">R 7.8</a> <dt>InfoText <a href="ref/CHAP069.htm#SSEC008.13">R 69.8.13</a> <dt>InfoTom <a href="ref/CHAP068.htm#SSEC006.1">R 68.6.1</a> <dt>InfoWarning <a href="ref/CHAP007.htm#SSEC004.6">R 7.4.6</a> <dt>Init <a href="ref/CHAP014.htm#SSEC005.3">R 14.5.3</a> <dt>init.g, for a GAP package <a href="ext/CHAP004.htm#I1">E 4.7</a> <dt>InitFusion <a href="ref/CHAP071.htm#SSEC005.1">R 71.5.1</a> <dt>InitPowerMap <a href="ref/CHAP071.htm#SSEC004.1">R 71.4.1</a> <dt>Injection <a href="new/CHAP004.htm#SSEC004.2">N 4.4.2</a> <dt>InjectionZeroMagma <a href="ref/CHAP033.htm#SSEC002.12">R 33.2.12</a> <dt>inner product, of group characters <a href="ref/CHAP070.htm#I26">R 70.8</a> <dt>InnerAutomorphism <a href="ref/CHAP038.htm#SSEC006.3">R 38.6.3</a> <dt>InnerAutomorphismNC <a href="ref/CHAP038.htm#SSEC006.3">R 38.6.3</a> <dt>InnerAutomorphismsAutomorphismGroup <a href="ref/CHAP038.htm#SSEC007.5">R 38.7.5</a> <dt>InParentFOA <a href="ext/CHAP006.htm#SSEC002.1">E 6.2.1</a> <dt>Input-Output Streams <a href="ref/CHAP010.htm#SECT008">R 10.8</a> <dt>InputLogTo <a href="ref/CHAP009.htm#SSEC007.7">R 9.7.7</a> <dt>InputLogTo, for streams <a href="ref/CHAP010.htm#SSEC004.6">R 10.4.6</a> <dt>InputLogTo, stop logging input <a href="ref/CHAP009.htm#SSEC007.8">R 9.7.8</a> <dt>InputOutputLocalProcess <a href="ref/CHAP010.htm#SSEC008.2">R 10.8.2</a> <dt>InputTextFile <a href="ref/CHAP010.htm#SSEC005.1">R 10.5.1</a> <dt>InputTextNone <a href="ref/CHAP010.htm#SSEC009.1">R 10.9.1</a> <dt>InputTextString <a href="ref/CHAP010.htm#SSEC007.1">R 10.7.1</a> <dt>InputTextUser <a href="ref/CHAP010.htm#SSEC006.1">R 10.6.1</a> <dt>InsertTrivialStabilizer <a href="ref/CHAP041.htm#SSEC010.8">R 41.10.8</a> <dt>InstallAtExit <a href="ref/CHAP006.htm#SSEC008.2">R 6.8.2</a> <dt>installation <a href="ref/CHAP073.htm#I0">R 73.0</a> <dt>Installation of GAP for MacOS <a href="ref/CHAP073.htm#SECT016">R 73.16</a> <dt>Installation of GAP Package Binaries <a href="ext/CHAP004.htm#SECT009">E 4.9</a> <dt>Installation Overview <a href="ref/CHAP073.htm#SECT001">R 73.1</a> <dt>InstallCharReadHookFunc <a href="ref/CHAP010.htm#SSEC010.1">R 10.10.1</a> <dt>InstalledPackageVersion <a href="ref/CHAP074.htm#SSEC003.3">R 74.3.3</a> <dt>InstallFactorMaintenance <a href="ref/CHAP030.htm#SSEC013.6">R 30.13.6</a> <dt>InstallFlushableValue <a href="prg/CHAP003.htm#SSEC017.6">P 3.17.6</a> <dt>InstallGlobalFunction <a href="prg/CHAP003.htm#SSEC017.4">P 3.17.4</a> <dt>InstallHandlingByNiceBasis <a href="ref/CHAP059.htm#SSEC011.1">R 59.11.1</a> <dt>InstallImmediateMethod <a href="prg/CHAP002.htm#SSEC006.1">P 2.6.1</a> <dt>Installing a GAP Package <a href="ref/CHAP074.htm#SECT001">R 74.1</a> <dt>Installing a Help Book <a href="ext/CHAP005.htm#SECT001">E 5.1</a> <dt>Installing GAP <a href="ref/CHAP073.htm">R 73.0</a> <dt>InstallIsomorphismMaintenance <a href="ref/CHAP030.htm#SSEC013.5">R 30.13.5</a> <dt>InstallMethod <a href="prg/CHAP002.htm#SSEC002.1">P 2.2.1</a> <dt>InstallOtherMethod <a href="prg/CHAP002.htm#SSEC002.2">P 2.2.2</a> <dt>InstallSubsetMaintenance <a href="ref/CHAP030.htm#SSEC013.4">R 30.13.4</a> <dt>InstallTrueMethod <a href="prg/CHAP002.htm#SSEC007.1">P 2.7.1</a> <dt>InstallValue <a href="prg/CHAP003.htm#SSEC017.6">P 3.17.6</a> <dt>Int <a href="ref/CHAP014.htm#SSEC001.3">R 14.1.3</a> <dt>Int, for cyclotomics <a href="ref/CHAP018.htm#I4">R 18.1</a> <dt>Int, for strings <a href="ref/CHAP026.htm#SSEC007.1">R 26.7.1</a> <dt>INT_CHAR <a href="ref/CHAP026.htm#SSEC006.1">R 26.6.1</a> <dt>integer part of a quotient <a href="ref/CHAP014.htm#I5">R 14.2</a> <dt>Integers <a href="ref/CHAP014.htm">R 14.0</a> <a href="ref/CHAP014.htm#">R 14.0</a> <dt>Integral Bases of Abelian Number Fields <a href="ref/CHAP058.htm#SECT003">R 58.3</a> <dt>Integral matrices and lattices <a href="ref/CHAP025.htm">R 25.0</a> <dt>IntegralizedMat <a href="ref/CHAP025.htm#SSEC004.4">R 25.4.4</a> <dt>IntegratedStraightLineProgram <a href="ref/CHAP035.htm#SSEC008.8">R 35.8.8</a> <dt>Interface to the GAP Help System <a href="ext/CHAP005.htm">E 5.0</a> <dt>IntermediateGroup <a href="ref/CHAP037.htm#SSEC017.17">R 37.17.17</a> <dt>IntermediateResultOfSLP <a href="ref/CHAP035.htm#SSEC008.10">R 35.8.10</a> <dt>IntermediateResultOfSLPWithoutOverwrite <a href="ref/CHAP035.htm#SSEC008.11">R 35.8.11</a> <dt>IntermediateResultsOfSLPWithoutOverwrite <a href="ref/CHAP035.htm#SSEC008.12">R 35.8.12</a> <dt>IntermediateSubgroups <a href="ref/CHAP037.htm#SSEC017.18">R 37.17.18</a> <dt>Internally Represented Cyclotomics <a href="ref/CHAP018.htm#SECT006">R 18.6</a> <dt>Internally Represented Strings <a href="ref/CHAP026.htm#SECT002">R 26.2</a> <dt>InterpolatedPolynomial <a href="ref/CHAP054.htm#SSEC007.9">R 54.7.9</a> <dt>IntersectBlist <a href="ref/CHAP022.htm#SSEC003.3">R 22.3.3</a> <dt>Intersection <a href="ref/CHAP028.htm#SSEC004.2">R 28.4.2</a> <dt>Intersection, for groups with pcgs <a href="ref/CHAP043.htm#I12">R 43.16</a> <dt>intersection, of collections <a href="ref/CHAP028.htm#I7">R 28.4</a> <dt>intersection, of sets <a href="ref/CHAP021.htm#I24">R 21.19</a> <dt>Intersection2 <a href="ref/CHAP028.htm#SSEC004.2">R 28.4.2</a> <dt>IntersectionBlist <a href="ref/CHAP022.htm#SSEC002.2">R 22.2.2</a> <dt>IntersectionsTom <a href="ref/CHAP068.htm#SSEC009.10">R 68.9.10</a> <dt>IntersectSet <a href="ref/CHAP021.htm#SSEC019.7">R 21.19.7</a> <dt>IntFFE <a href="ref/CHAP057.htm#SSEC002.3">R 57.2.3</a> <dt>IntFFESymm <a href="ref/CHAP057.htm#SSEC002.4">R 57.2.4</a> <dt>IntHexString <a href="ref/CHAP026.htm#SSEC007.1">R 26.7.1</a> <dt>Introducing new Viewer for the Online Help <a href="ext/CHAP005.htm#SECT004">E 5.4</a> <dt>IntScalarProducts <a href="ref/CHAP071.htm#SSEC003.15">R 71.3.15</a> <a href="ref/CHAP071.htm#I8">R 71.3</a> <dt>IntVecFFE <a href="ref/CHAP057.htm#SSEC002.5">R 57.2.5</a> <dt>Invariant Forms <a href="ref/CHAP042.htm#SECT004">R 42.4</a> <a href="ref/CHAP067.htm#SECT009">R 67.9</a> <dt>InvariantBilinearForm <a href="ref/CHAP042.htm#SSEC004.1">R 42.4.1</a> <dt>InvariantElementaryAbelianSeries <a href="ref/CHAP037.htm#SSEC017.10">R 37.17.10</a> <dt>InvariantLattice <a href="ref/CHAP042.htm#SSEC005.6">R 42.5.6</a> <dt>InvariantQuadraticForm <a href="ref/CHAP042.htm#SSEC004.5">R 42.4.5</a> <dt>InvariantSesquilinearForm <a href="ref/CHAP042.htm#SSEC004.3">R 42.4.3</a> <dt>InvariantSubgroupsElementaryAbelianGroup <a href="ref/CHAP037.htm#SSEC021.2">R 37.21.2</a> <dt>Inverse <a href="ref/CHAP030.htm#SSEC010.8">R 30.10.8</a> <dt>Inverse, group homomorphism <a href="ref/CHAP038.htm#I1">R 38.2</a> <dt>inverse, matrix <a 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69.8</a> <dt>IsFiniteDimensional <a href="ref/CHAP055.htm#SSEC003.5">R 55.3.5</a> <dt>IsFiniteDimensional, for matrix algebras <a href="ref/CHAP060.htm#SSEC007.7">R 60.7.7</a> <dt>IsFiniteFieldPolynomialRing <a href="ref/CHAP064.htm#SSEC014.5">R 64.14.5</a> <dt>IsFinitelyGeneratedGroup <a href="ref/CHAP037.htm#SSEC015.12">R 37.15.12</a> <dt>IsFiniteOrderElement <a href="ref/CHAP030.htm#SSEC015.4">R 30.15.4</a> <dt>IsFiniteOrderElementCollColl <a href="ref/CHAP030.htm#SSEC015.4">R 30.15.4</a> <dt>IsFiniteOrderElementCollection <a href="ref/CHAP030.htm#SSEC015.4">R 30.15.4</a> <dt>IsFiniteOrdersPcgs <a href="ref/CHAP043.htm#SSEC004.2">R 43.4.2</a> <dt>IsFixedStabilizer <a href="ref/CHAP041.htm#SSEC010.9">R 41.10.9</a> <dt>IsFLMLOR <a href="ref/CHAP060.htm#SSEC007.1">R 60.7.1</a> <dt>IsFLMLORWithOne <a href="ref/CHAP060.htm#SSEC007.2">R 60.7.2</a> <dt>IsFpGroup <a href="ref/CHAP045.htm#">R 45.0</a> <dt>IsFpMonoid <a href="ref/CHAP051.htm#">R 51.0</a> <dt>IsFpSemigroup <a 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href="ref/CHAP063.htm#SSEC001.5">R 63.1.5</a> <dt>IsHandledByNiceBasis <a href="ref/CHAP055.htm#SSEC003.13">R 55.3.13</a> <dt>IsHandledByNiceBasis, for vector spaces <a href="ref/CHAP059.htm#SSEC010.6">R 59.10.6</a> <dt>IsHandledByNiceMonomorphism <a href="ref/CHAP038.htm#SSEC005.1">R 38.5.1</a> <dt>IsHash <a href="new/CHAP002.htm#SSEC003.1">N 2.3.1</a> <dt>IsHasseDiagram <a href="ref/CHAP032.htm#SSEC002.7">R 32.2.7</a> <dt>IsHomCoset <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetOfAdditiveElt <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetOfFp <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetOfMatrix <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetOfPerm <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetOfTuple <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToAdditiveElt <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToAdditiveEltRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToFp <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToFpRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToMatrix <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToMatrixRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToObjectRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToPerm <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToPermRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToTuple <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomCosetToTupleRep <a href="new/CHAP003.htm#">N 3.0</a> <dt>IsHomogeneousList <a href="ref/CHAP021.htm#SSEC001.3">R 21.1.3</a> <dt>IsIdempotent <a href="ref/CHAP030.htm#SSEC010.7">R 30.10.7</a> <dt>IsIdenticalObj <a href="ref/CHAP012.htm#SSEC005.1">R 12.5.1</a> <dt>IsIdenticalObj <a href="tut/CHAP002.htm#I23">T 2.6</a> <dt>IsInChain <a href="new/CHAP005.htm#">N 5.0</a> <dt>IsIncomparableUnder <a href="ref/CHAP029.htm#SSEC002.3">R 29.2.3</a> <dt>IsInducedFromNormalSubgroup <a href="ref/CHAP072.htm#SSEC002.4">R 72.2.4</a> <dt>IsInducedPcgs <a href="ref/CHAP043.htm#SSEC007.1">R 43.7.1</a> 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href="ref/CHAP042.htm#SSEC005.4">R 42.5.4</a> <dt>IsNaturalSL <a href="ref/CHAP042.htm#SSEC003.4">R 42.3.4</a> <dt>IsNaturalSLnZ <a href="ref/CHAP042.htm#SSEC005.5">R 42.5.5</a> <dt>IsNaturalSymmetricGroup <a href="ref/CHAP041.htm#SSEC003.1">R 41.3.1</a> <dt>IsNearAdditiveElement <a href="ref/CHAP030.htm#SSEC014.2">R 30.14.2</a> <dt>IsNearAdditiveElementWithInverse <a href="ref/CHAP030.htm#SSEC014.6">R 30.14.6</a> <dt>IsNearAdditiveElementWithZero <a href="ref/CHAP030.htm#SSEC014.4">R 30.14.4</a> <dt>IsNearAdditiveGroup <a href="ref/CHAP053.htm#SSEC001.3">R 53.1.3</a> <dt>IsNearAdditiveMagma <a href="ref/CHAP053.htm#SSEC001.1">R 53.1.1</a> <dt>IsNearAdditiveMagmaWithInverses <a href="ref/CHAP053.htm#SSEC001.3">R 53.1.3</a> <dt>IsNearAdditiveMagmaWithZero <a href="ref/CHAP053.htm#SSEC001.2">R 53.1.2</a> <dt>IsNearlyCharacterTable <a href="ref/CHAP069.htm#SSEC004.1">R 69.4.1</a> <dt>IsNearRingElement <a href="ref/CHAP030.htm#SSEC014.15">R 30.14.15</a> <dt>IsNearRingElementWithInverse <a href="ref/CHAP030.htm#SSEC014.19">R 30.14.19</a> <dt>IsNearRingElementWithOne <a href="ref/CHAP030.htm#SSEC014.17">R 30.14.17</a> <dt>IsNegRat <a href="ref/CHAP016.htm#SSEC001.3">R 16.1.3</a> <dt>IsNilpotent, for character tables <a href="ref/CHAP069.htm#I19">R 69.8</a> <dt>IsNilpotent, for groups with pcgs <a href="ref/CHAP043.htm#I0">R 43.16</a> <dt>IsNilpotentElement <a href="ref/CHAP061.htm#SSEC009.5">R 61.9.5</a> <dt>IsNilpotentGroup <a href="ref/CHAP037.htm#SSEC015.3">R 37.15.3</a> <dt>IsNilpotentTom <a href="ref/CHAP068.htm#SSEC008.1">R 68.8.1</a> <dt>IsNonassocWord <a href="ref/CHAP034.htm#SSEC001.3">R 34.1.3</a> <dt>IsNonassocWordCollection <a href="ref/CHAP034.htm#SSEC001.4">R 34.1.4</a> <dt>IsNonassocWordWithOne <a href="ref/CHAP034.htm#SSEC001.3">R 34.1.3</a> <dt>IsNonassocWordWithOneCollection <a href="ref/CHAP034.htm#SSEC001.4">R 34.1.4</a> <dt>IsNonnegativeIntegers <a href="ref/CHAP014.htm#">R 14.0</a> <dt>IsNonSPGeneralMapping <a href="ref/CHAP031.htm#SSEC013.1">R 31.13.1</a> <dt>IsNonTrivial <a href="ref/CHAP028.htm#SSEC003.4">R 28.3.4</a> <dt>IsNormal <a href="ref/CHAP037.htm#SSEC003.6">R 37.3.6</a> <dt>IsNormalBasis <a href="ref/CHAP059.htm#SSEC006.3">R 59.6.3</a> <dt>IsNotIdenticalObj <a href="ref/CHAP012.htm#SSEC005.2">R 12.5.2</a> <dt>IsNumberField <a href="ref/CHAP058.htm#SSEC002.1">R 58.2.1</a> <dt>IsObject <a href="ref/CHAP012.htm#SSEC001.1">R 12.1.1</a> <dt>IsOddInt <a href="ref/CHAP014.htm#SSEC001.5">R 14.1.5</a> <dt>isomorphic, pc group <a href="ref/CHAP044.htm#I0">R 44.4</a> <a href="ref/CHAP044.htm#I1">R 44.5</a> <dt>IsomorphicSubgroups <a href="ref/CHAP038.htm#SSEC009.3">R 38.9.3</a> <dt>IsomorphismFpAlgebra <a href="ref/CHAP060.htm#SSEC009.9">R 60.9.9</a> <dt>IsomorphismFpGroup <a href="ref/CHAP045.htm#SSEC010.1">R 45.10.1</a> <dt>IsomorphismFpGroup, for subgroups of fp groups <a href="ref/CHAP045.htm#I1">R 45.11</a> <dt>IsomorphismFpGroupByGenerators <a href="ref/CHAP045.htm#SSEC010.2">R 45.10.2</a> 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href="ref/CHAP038.htm#I3">R 38.9</a> <dt>Isomorphisms vs. Isomorphic Structures <a href="tut/CHAP009.htm#SECT015">T 9.15</a> <dt>IsomorphismSCAlgebra <a href="ref/CHAP060.htm#SSEC009.11">R 60.9.11</a> <dt>IsomorphismSimplifiedFpGroup <a href="ref/CHAP045.htm#SSEC011.1">R 45.11.1</a> <dt>IsomorphismSpecialPcGroup <a href="ref/CHAP044.htm#SSEC005.3">R 44.5.3</a> <dt>IsomorphismTransformationSemigroup <a href="ref/CHAP049.htm#SSEC001.3">R 49.1.3</a> <dt>IsomorphismTypeInfoFiniteSimpleGroup <a href="ref/CHAP037.htm#SSEC015.11">R 37.15.11</a> <dt>IsOne <a href="ref/CHAP030.htm#SSEC010.5">R 30.10.5</a> <dt>IsOperation <a href="ref/CHAP005.htm#SSEC004.2">R 5.4.2</a> <dt>IsOrdering <a href="ref/CHAP029.htm#">R 29.0</a> <dt>IsOrderingOnFamilyOfAssocWords <a href="ref/CHAP029.htm#SSEC003.1">R 29.3.1</a> <dt>IsOrdinaryMatrix <a href="ref/CHAP024.htm#SSEC001.2">R 24.1.2</a> <dt>IsOrdinaryTable <a href="ref/CHAP069.htm#SSEC004.1">R 69.4.1</a> <dt>IsOutputStream <a href="ref/CHAP010.htm#SSEC001.6">R 10.1.6</a> <dt>IsOutputTextNone <a href="ref/CHAP010.htm#SSEC001.8">R 10.1.8</a> <dt>IsOutputTextStream <a href="ref/CHAP010.htm#SSEC001.7">R 10.1.7</a> <dt>IsPadicExtensionNumber <a href="ref/CHAP066.htm#SSEC002.3">R 66.2.3</a> <dt>IsPadicExtensionNumberFamily <a href="ref/CHAP066.htm#SSEC002.4">R 66.2.4</a> <dt>IsParentPcgsFamilyPcgs <a href="ref/CHAP044.htm#SSEC001.4">R 44.1.4</a> <dt>IsPartialOrderBinaryRelation <a href="ref/CHAP032.htm#SSEC002.6">R 32.2.6</a> <dt>IsPcGroup <a href="ref/CHAP044.htm#SSEC003.1">R 44.3.1</a> <dt>IsPcGroupGeneralMappingByImages <a href="ref/CHAP038.htm#SSEC010.7">R 38.10.7</a> <dt>IsPcGroupHomomorphismByImages <a href="ref/CHAP038.htm#SSEC010.7">R 38.10.7</a> <dt>IsPcgs <a href="ref/CHAP043.htm#SSEC002.2">R 43.2.2</a> <dt>IsPcgsCentralSeries <a href="ref/CHAP043.htm#SSEC011.5">R 43.11.5</a> <dt>IsPcgsChiefSeries <a href="ref/CHAP043.htm#SSEC011.13">R 43.11.13</a> <dt>IsPcgsElementaryAbelianSeries <a href="ref/CHAP043.htm#SSEC011.1">R 43.11.1</a> 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<dt>IsRowSpace <a href="ref/CHAP059.htm#SSEC008.1">R 59.8.1</a> <dt>IsRowVector <a href="ref/CHAP023.htm#">R 23.0</a> <dt>IsScalar <a href="ref/CHAP030.htm#SSEC014.20">R 30.14.20</a> <dt>IsSemiEchelonized <a href="ref/CHAP059.htm#SSEC008.7">R 59.8.7</a> <dt>IsSemigroup <a href="ref/CHAP049.htm#">R 49.0</a> <dt>IsSemigroupCongruence <a href="ref/CHAP049.htm#SSEC003.1">R 49.3.1</a> <dt>IsSemigroupIdeal <a href="ref/CHAP049.htm#SSEC002.3">R 49.2.3</a> <dt>IsSemiRegular <a href="ref/CHAP039.htm#SSEC009.4">R 39.9.4</a> <dt>IsSet <a href="ref/CHAP021.htm#SSEC017.4">R 21.17.4</a> <dt>IsSet <a href="tut/CHAP009.htm#I11">T 9.4</a> <dt>IsShortLexLessThanOrEqual <a href="ref/CHAP035.htm#SSEC003.3">R 35.3.3</a> <dt>IsShortLexOrdering <a href="ref/CHAP029.htm#SSEC003.7">R 29.3.7</a> <dt>IsSimple, for character tables <a href="ref/CHAP069.htm#I21">R 69.8</a> <dt>IsSimpleAlgebra <a href="ref/CHAP060.htm#SSEC007.6">R 60.7.6</a> <dt>IsSimpleGroup <a href="ref/CHAP037.htm#SSEC015.10">R 37.15.10</a> <dt>IsSimpleSemigroup <a href="ref/CHAP049.htm#">R 49.0</a> <dt>IsSingleValued <a href="ref/CHAP031.htm#SSEC002.2">R 31.2.2</a> <dt>IsSL <a href="ref/CHAP042.htm#SSEC003.3">R 42.3.3</a> <dt>IsSolvable, for character tables <a href="ref/CHAP069.htm#I22">R 69.8</a> <dt>IsSolvableGroup <a href="ref/CHAP037.htm#SSEC015.6">R 37.15.6</a> <dt>IsSolvableTom <a href="ref/CHAP068.htm#SSEC008.1">R 68.8.1</a> <dt>IsSortedList <a href="ref/CHAP021.htm#SSEC017.3">R 21.17.3</a> <dt>IsSpecialLinearGroup <a href="ref/CHAP042.htm#SSEC003.3">R 42.3.3</a> <dt>IsSpecialPcgs <a href="ref/CHAP043.htm#SSEC013.1">R 43.13.1</a> <dt>IsSPGeneralMapping <a href="ref/CHAP031.htm#SSEC013.1">R 31.13.1</a> <dt>IsSporadicSimple, for character tables <a href="ref/CHAP069.htm#I23">R 69.8</a> <dt>IsSSortedList <a href="ref/CHAP021.htm#SSEC017.4">R 21.17.4</a> <dt>IsStandardGeneratorsOfGroup <a href="ref/CHAP068.htm#SSEC010.4">R 68.10.4</a> <dt>IsStraightLineProgElm <a href="ref/CHAP035.htm#SSEC009.1">R 35.9.1</a> <dt>IsStraightLineProgram <a href="ref/CHAP035.htm#SSEC008.1">R 35.8.1</a> <dt>IsStream <a href="ref/CHAP010.htm#SSEC001.1">R 10.1.1</a> <dt>IsString <a href="ref/CHAP026.htm#">R 26.0</a> <dt>IsStringRep <a href="ref/CHAP026.htm#SSEC002.1">R 26.2.1</a> <dt>IsStruct <a href="ref/CHAP030.htm#SSEC006.1">R 30.6.1</a> <dt>IsSubgroup <a href="ref/CHAP037.htm#SSEC003.5">R 37.3.5</a> <dt>IsSubgroupFpGroup <a href="ref/CHAP045.htm#">R 45.0</a> <dt>IsSubgroupOfWholeGroupByQuotientRep <a href="ref/CHAP045.htm#SSEC012.2">R 45.12.2</a> <dt>IsSubgroupSL <a href="ref/CHAP042.htm#SSEC003.5">R 42.3.5</a> <dt>IsSubmonoidFpMonoid <a href="ref/CHAP051.htm#">R 51.0</a> <dt>IsSubnormal <a href="ref/CHAP037.htm#SSEC003.10">R 37.3.10</a> <dt>IsSubnormallyMonomial <a href="ref/CHAP072.htm#SSEC003.5">R 72.3.5</a> <dt>IsSubsemigroupFpSemigroup <a href="ref/CHAP051.htm#">R 51.0</a> <dt>IsSubset <a href="ref/CHAP028.htm#SSEC004.1">R 28.4.1</a> <dt>IsSubsetBlist <a href="ref/CHAP022.htm#SSEC001.4">R 22.1.4</a> <dt>IsSubsetLocallyFiniteGroup <a href="ref/CHAP037.htm#SSEC015.13">R 37.15.13</a> <dt>IsSubsetSet <a href="ref/CHAP021.htm#SSEC019.3">R 21.19.3</a> <dt>IsSubspacesVectorSpace <a href="ref/CHAP059.htm#SSEC003.2">R 59.3.2</a> <dt>IsSubstruct <a href="ref/CHAP030.htm#SSEC008.4">R 30.8.4</a> <dt>IsSupersolvable, for character tables <a href="ref/CHAP069.htm#I24">R 69.8</a> <dt>IsSupersolvable, for groups with pcgs <a href="ref/CHAP043.htm#I1">R 43.16</a> <dt>IsSupersolvableGroup <a href="ref/CHAP037.htm#SSEC015.8">R 37.15.8</a> <dt>IsSurjective <a href="ref/CHAP031.htm#SSEC002.5">R 31.2.5</a> <dt>IsSyllableAssocWordRep <a href="ref/CHAP035.htm#SSEC006.5">R 35.6.5</a> <dt>IsSyllableWordsFamily <a href="ref/CHAP035.htm#SSEC006.6">R 35.6.6</a> <dt>IsSymmetricBinaryRelation <a href="ref/CHAP032.htm#SSEC002.2">R 32.2.2</a> <dt>IsSymmetricGroup <a href="ref/CHAP041.htm#SSEC003.3">R 41.3.3</a> <dt>IsTable <a href="ref/CHAP021.htm#SSEC001.4">R 21.1.4</a> <dt>IsTableOfMarks <a href="ref/CHAP068.htm#SSEC006.2">R 68.6.2</a> <dt>IsTableOfMarksWithGens <a href="ref/CHAP068.htm#SSEC011.3">R 68.11.3</a> <dt>IsToPcGroupGeneralMappingByImages <a href="ref/CHAP038.htm#SSEC010.8">R 38.10.8</a> <dt>IsToPcGroupHomomorphismByImages <a href="ref/CHAP038.htm#SSEC010.8">R 38.10.8</a> <dt>IsToPermGroupGeneralMappingByImages <a href="ref/CHAP038.htm#SSEC010.5">R 38.10.5</a> <dt>IsToPermGroupHomomorphismByImages <a href="ref/CHAP038.htm#SSEC010.5">R 38.10.5</a> <dt>IsTotal <a href="ref/CHAP031.htm#SSEC002.1">R 31.2.1</a> <dt>IsTotalOrdering <a href="ref/CHAP029.htm#SSEC002.2">R 29.2.2</a> <dt>IsTransformation <a href="ref/CHAP052.htm#">R 52.0</a> <dt>IsTransformationCollection <a href="ref/CHAP052.htm#">R 52.0</a> <dt>IsTransformationMonoid <a href="ref/CHAP049.htm#SSEC001.1">R 49.1.1</a> <dt>IsTransformationSemigroup <a href="ref/CHAP049.htm#SSEC001.1">R 49.1.1</a> <dt>IsTransitive, for characters <a href="ref/CHAP070.htm#SSEC008.15">R 70.8.15</a> <dt>IsTransitive, for class functions <a href="ref/CHAP070.htm#I28">R 70.8</a> <dt>IsTransitive, for group actions <a href="ref/CHAP039.htm#SSEC009.1">R 39.9.1</a> <dt>IsTransitiveBinaryRelation <a href="ref/CHAP032.htm#SSEC002.3">R 32.2.3</a> <dt>IsTranslationInvariantOrdering <a href="ref/CHAP029.htm#SSEC003.2">R 29.3.2</a> <dt>IsTrivial <a href="ref/CHAP028.htm#SSEC003.3">R 28.3.3</a> <dt>IsTuple <a href="ref/CHAP031.htm#">R 31.0</a> <dt>IsTwoSidedIdeal <a href="ref/CHAP054.htm#SSEC002.3">R 54.2.3</a> <dt>IsTwoSidedIdealInParent <a href="ref/CHAP054.htm#SSEC002.3">R 54.2.3</a> <dt>IsUEALatticeElement <a href="ref/CHAP061.htm#SSEC013.5">R 61.13.5</a> <dt>IsUEALatticeElementCollection <a href="ref/CHAP061.htm#SSEC013.5">R 61.13.5</a> <dt>IsUEALatticeElementFamily <a href="ref/CHAP061.htm#SSEC013.5">R 61.13.5</a> <dt>IsUniqueFactorizationRing <a href="ref/CHAP054.htm#SSEC004.2">R 54.4.2</a> <dt>IsUnit <a href="ref/CHAP054.htm#SSEC005.1">R 54.5.1</a> <dt>IsUnivariatePolynomial <a href="ref/CHAP064.htm#SSEC004.8">R 64.4.8</a> <dt>IsUnivariatePolynomialRing <a href="ref/CHAP064.htm#SSEC015.2">R 64.15.2</a> <dt>IsUnivariateRationalFunction <a href="ref/CHAP064.htm#SSEC004.6">R 64.4.6</a> <dt>IsUnknown <a href="ref/CHAP019.htm#">R 19.0</a> <dt>IsUpperAlphaChar <a href="ref/CHAP026.htm#SSEC003.3">R 26.3.3</a> <dt>IsUpperTriangularMat <a href="ref/CHAP024.htm#SSEC003.9">R 24.3.9</a> <dt>IsValidIdentifier <a href="ref/CHAP004.htm#SSEC006.1">R 4.6.1</a> <dt>IsVector <a href="ref/CHAP030.htm#SSEC014.14">R 30.14.14</a> <dt>IsVectorSpace <a href="ref/CHAP059.htm#">R 59.0</a> <dt>IsVirtualCharacter <a href="ref/CHAP070.htm#SSEC008.2">R 70.8.2</a> <dt>IsWeightLexOrdering <a href="ref/CHAP029.htm#SSEC003.9">R 29.3.9</a> <dt>IsWeightRepElement <a href="ref/CHAP061.htm#SSEC013.8">R 61.13.8</a> <dt>IsWeightRepElementCollection <a href="ref/CHAP061.htm#SSEC013.8">R 61.13.8</a> <dt>IsWeightRepElementFamily <a href="ref/CHAP061.htm#SSEC013.8">R 61.13.8</a> <dt>IsWellFoundedOrdering <a href="ref/CHAP029.htm#SSEC002.1">R 29.2.1</a> <dt>IsWeylGroup <a href="ref/CHAP061.htm#SSEC007.15">R 61.7.15</a> <dt>IsWholeFamily <a href="ref/CHAP028.htm#SSEC003.5">R 28.3.5</a> <dt>IsWLetterAssocWordRep <a href="ref/CHAP035.htm#SSEC006.3">R 35.6.3</a> <dt>IsWLetterWordsFamily <a href="ref/CHAP035.htm#SSEC006.4">R 35.6.4</a> <dt>IsWord <a href="ref/CHAP034.htm#SSEC001.1">R 34.1.1</a> <dt>IsWordCollection <a href="ref/CHAP034.htm#SSEC001.2">R 34.1.2</a> <dt>IsWordWithInverse <a href="ref/CHAP034.htm#SSEC001.1">R 34.1.1</a> <dt>IsWordWithOne <a href="ref/CHAP034.htm#SSEC001.1">R 34.1.1</a> <dt>IsWreathProductOrdering <a href="ref/CHAP029.htm#SSEC003.14">R 29.3.14</a> <dt>IsWritableFile <a href="ref/CHAP009.htm#SSEC006.3">R 9.6.3</a> <dt>IsZero <a href="ref/CHAP030.htm#SSEC010.6">R 30.10.6</a> <dt>IsZeroGroup <a href="ref/CHAP049.htm#">R 49.0</a> <dt>IsZeroSimpleSemigroup <a href="ref/CHAP049.htm#">R 49.0</a> <dt>IsZeroSquaredElement <a href="ref/CHAP030.htm#SSEC015.6">R 30.15.6</a> <dt>IsZeroSquaredElementCollColl <a href="ref/CHAP030.htm#SSEC015.6">R 30.15.6</a> <dt>IsZeroSquaredElementCollection <a href="ref/CHAP030.htm#SSEC015.6">R 30.15.6</a> <dt>IsZeroSquaredRing <a href="ref/CHAP054.htm#SSEC004.7">R 54.4.7</a> <dt>IsZmodnZObj <a href="ref/CHAP014.htm#SSEC004.4">R 14.4.4</a> <dt>IsZmodnZObjNonprime <a href="ref/CHAP014.htm#SSEC004.4">R 14.4.4</a> <dt>IsZmodpZObj <a href="ref/CHAP014.htm#SSEC004.4">R 14.4.4</a> <dt>IsZmodpZObjLarge <a href="ref/CHAP014.htm#SSEC004.4">R 14.4.4</a> <dt>IsZmodpZObjSmall <a href="ref/CHAP014.htm#SSEC004.4">R 14.4.4</a> <dt>Iterated <a href="ref/CHAP021.htm#SSEC020.25">R 21.20.25</a> <dt>Iterator <a href="ref/CHAP028.htm#SSEC007.1">R 28.7.1</a> <dt>iterator, for low index subgroups <a href="ref/CHAP045.htm#I0">R 45.9</a> <dt>IteratorByBasis <a href="ref/CHAP059.htm#SSEC005.6">R 59.5.6</a> <dt>IteratorByFunctions <a href="ref/CHAP028.htm#SSEC007.8">R 28.7.8</a> <dt>IteratorList <a href="ref/CHAP028.htm#SSEC007.6">R 28.7.6</a> <dt>Iterators <a href="ref/CHAP028.htm#SECT007">R 28.7</a> <dt>IteratorSorted <a href="ref/CHAP028.htm#SSEC007.2">R 28.7.2</a> </dl><p> [<a href="../index.html">Top</a>] [<a href="chapters.htm">Up</a>] <p><P> <address>GAP 4 manual<br></address> </body></html>