  
  
  [1XIndex[101X
  
  [10X * [110X (for Rees (0-)matrix semigroup isomorphisms by triples)  17.2-6
  [10X*[110X (for bipartitions)  3.4
  [10X * [110X (for PBRs)  4.4
  [10X*[110X (for matrices over a semiring)  5.2
  [10X<[110X (for Rees (0-)matrix semigroup isomorphisms by triples)  17.2-6
  [10X<[110X (for bipartitions)  3.4
  [10X<[110X (for PBRs)  4.4
  [10X<[110X (for matrices over a semiring)  5.2
  [10X = [110X (for Rees (0-)matrix semigroup isomorphisms by triples)  17.2-6
  [10X=[110X (for bipartitions)  3.4
  [10X=[110X (for PBRs)  4.4
  [10X=[110X (for matrices over a semiring)  5.2
  [2X\<[102X (for Green's classes)  12.3-1
  [2X\^[102X (for a matrix over finite field group and matrix over finite field)  5.7-8
  [2X\in[102X  5.3-3
  [10X ^ [110X (for Rees (0-)matrix semigroup isomorphisms by triples)  17.2-6
  [2XAnnularJonesMonoid[102X  8.3-5
  [2XApsisMonoid[102X  8.3-11
  [2XAsBipartition[102X  3.3-1
  [2XAsBlockBijection[102X  3.3-2
  [2XAsBooleanMat[102X  5.3-2
  [2XAsInverseSemigroupCongruenceByKernelTrace[102X  16.7-3
  [2XAsList[102X  5.1-10
  [2XAsListCanonical[102X  13.1-1
  [2XAsMatrix[102X (for a filter and a matrix)  5.1-6
  [2XAsMatrix[102X (for a filter, matrix, and threshold)  5.1-6
  [2XAsMatrix[102X (for a filter, matrix, threshold, and period)  5.1-6
  [2XAsMatrixGroup[102X  5.7-10
  [2XAsMonoid[102X  6.5-4
  [2XAsMutableList[102X  5.1-10
  [2XAsPartialPerm[102X (for a bipartition)  3.3-4
  [2XAsPartialPerm[102X (for a PBR)  4.3-3
  [2XAsPBR[102X  4.3-1
  [2XAsPermutation[102X (for a bipartition)  3.3-5
  [2XAsPermutation[102X (for a PBR)  4.3-4
  [2XAsRMSCongruenceByLinkedTriple[102X  16.6-8
  [2XAsRZMSCongruenceByLinkedTriple[102X  16.6-8
  [2XAsSemigroup[102X  6.5-3
  [2XAsSemigroupCongruenceByGeneratingPairs[102X  16.6-7
  [2XAsTransformation[102X (for a bipartition)  3.3-3
  [2XAsTransformation[102X (for a PBR)  4.3-2
  [2XBaseDomain[102X (for a matrix over finite field)  5.4-7
  [2XBipartition[102X  3.2-1
  [2XBipartitionByIntRep[102X  3.2-2
  [2XBlistNumber[102X  5.3-7
  [2XBlocksNC[102X  3.6-2
  [2XBooleanMat[102X  5.3-1
  [2XBooleanMatNumber[102X  5.3-6
  [2XBrauerMonoid[102X  8.3-2
  [2XCanonicalBlocks[102X  3.5-18
  [2XCanonicalBooleanMat[102X  5.3-8
  [2XCanonicalBooleanMat[102X (for a perm group and boolean matrix)  5.3-8
  [2XCanonicalBooleanMat[102X (for a perm group, perm group and boolean matrix)  5.3-8
  [2XCanonicalForm[102X (for a free inverse semigroup element)  10.3-1
  [2XCanonicalRepresentative[102X  16.6-6
  [2XCanonicalTransformation[102X  13.12-9
  [2XCatalanMonoid[102X  8.1-1
  [2XCharacterTableOfInverseSemigroup[102X  15.1-10
  [2XClosureInverseMonoid[102X  6.4-1
  [2XClosureInverseSemigroup[102X  6.4-1
  [2XClosureMonoid[102X  6.4-1
  [2XClosureSemigroup[102X  6.4-1
  [2XCodomainOfBipartition[102X  3.5-11
  [2XComponentRepsOfPartialPermSemigroup[102X  13.13-1
  [2XComponentRepsOfTransformationSemigroup[102X  13.12-1
  [2XComponentsOfPartialPermSemigroup[102X  13.13-2
  [2XComponentsOfTransformationSemigroup[102X  13.12-2
  [2XCompositionMapping2[102X (for IsRMSIsoByTriple)  17.2-4
  [2XCompositionMapping2[102X (for IsRZMSIsoByTriple)  17.2-4
  [2XCongruenceClasses[102X  16.3-5
  [2XCongruenceClassOfElement[102X  16.3-4
  [2XCongruencesOfPoset[102X  16.4-7
  [2XCongruencesOfSemigroup[102X (for a semigroup and a multiplicative element collection)  16.4-1
  [2XCongruencesOfSemigroup[102X (for a semigroup)  16.4-1
  [2XContentOfFreeBandElement[102X  10.4-7
  [2XContentOfFreeBandElementCollection[102X  10.4-7
  [2XCrossedApsisMonoid[102X  8.3-11
  [2XCyclesOfPartialPerm[102X  13.13-3
  [2XCyclesOfPartialPermSemigroup[102X  13.13-4
  [2XCyclesOfTransformationSemigroup[102X  13.12-3
  [2XDClass[102X  12.1-2
  [2XDClasses[102X  12.1-4
  [2XDClassNC[102X  12.1-3
  [2XDClassOfHClass[102X  12.1-1
  [2XDClassOfLClass[102X  12.1-1
  [2XDClassOfRClass[102X  12.1-1
  [2XDClassReps[102X  12.1-5
  [2XDegreeOfBipartition[102X  3.5-1
  [2XDegreeOfBipartitionCollection[102X  3.5-1
  [2XDegreeOfBipartitionSemigroup[102X  3.8-5
  [2XDegreeOfBlocks[102X  3.6-5
  [2XDegreeOfPBR[102X  4.5-2
  [2XDegreeOfPBRCollection[102X  4.5-2
  [2XDegreeOfPBRSemigroup[102X  4.6-2
  [2XDigraphOfActionOnPairs[102X (for a transformation semigroup and an integer)  13.12-4
  [2XDigraphOfActionOnPairs[102X (for a transformation semigroup)  13.12-4
  [2XDigraphOfActionOnPoints[102X (for a transformation semigroup and an integer)  13.12-5
  [2XDigraphOfActionOnPoints[102X (for a transformation semigroup)  13.12-5
  [2XDimensionOfMatrixOverSemiring[102X  5.1-3
  [2XDimensionOfMatrixOverSemiringCollection[102X  5.1-4
  [2XDirectProduct[102X  6.4-4
  [2XDirectProductOp[102X  6.4-4
  [2XDomainOfBipartition[102X  3.5-10
  [2XDotSemilatticeOfIdempotents[102X  18.2-2
  [2XDotString[102X  18.2-1
  [2XDualSymmetricInverseMonoid[102X  8.3-7
  [2XDualSymmetricInverseSemigroup[102X  8.3-7
  [2XELM_LIST[102X (for IsRMSIsoByTriple)  17.2-3
  [10XELM_LIST[110X (for Rees (0-)matrix semigroup isomorphisms by triples)  17.2-6
  [2XEmptyPBR[102X  4.2-3
  [2XEndomorphismMonoid[102X (for a digraph and vertex coloring)  6.7-1
  [2XEndomorphismMonoid[102X (for a digraph)  6.7-1
  [2XEndomorphismsPartition[102X  8.1-2
  [2XEnumerate[102X  13.1-3
  [2XEnumeratorCanonical[102X  13.1-1
  [2XEquivalenceRelationCanonicalLookup[102X  16.3-11
  [2XEquivalenceRelationCanonicalPartition[102X  16.3-12
  [2XEquivalenceRelationLookup[102X  16.3-10
  [2XEvaluateWord[102X  13.5-1
  [2XExtRepOfObj[102X (for a bipartition)  3.5-3
  [2XExtRepOfObj[102X (for a blocks)  3.6-3
  [2XExtRepOfObj[102X (for a PBR)  4.5-3
  [2XFactorisableDualSymmetricInverseMonoid[102X  8.3-8
  [2XFactorization[102X  13.5-2
  [2XFixedPointsOfTransformationSemigroup[102X (for a transformation semigroup)  13.12-6
  [2XFreeBand[102X (for a given rank)  10.4-1
  [2XFreeBand[102X (for a list of names)  10.4-1
  [2XFreeBand[102X (for various names)  10.4-1
  [2XFreeInverseSemigroup[102X (for a given rank)  10.1-1
  [2XFreeInverseSemigroup[102X (for a list of names)  10.1-1
  [2XFreeInverseSemigroup[102X (for various names)  10.1-1
  [2XFullBooleanMatMonoid[102X  8.6-1
  [2XFullMatrixMonoid[102X  8.5-1
  [2XFullPBRMonoid[102X  8.4-1
  [2XFullTropicalMaxPlusMonoid[102X  8.7-1
  [2XFullTropicalMinPlusMonoid[102X  8.7-2
  [2XGeneralLinearMonoid[102X  8.5-1
  [2XGeneratingPairsOfLeftSemigroupCongruence[102X  16.2-4
  [2XGeneratingPairsOfRightSemigroupCongruence[102X  16.2-4
  [2XGeneratingPairsOfSemigroupCongruence[102X  16.2-4
  [2XGenerators[102X  13.6-1
  [2XGeneratorsOfSemigroupIdeal[102X  7.2-1
  [2XGeneratorsSmallest[102X (for a semigroup)  13.6-5
  [2XGLM[102X  8.5-1
  [2XGossipMonoid[102X  8.6-5
  [2XGraphInverseSemigroup[102X  11.1-1
  [2XGraphOfGraphInverseSemigroup[102X  11.1-5
  [2XGreensDClasses[102X  12.1-4
  [2XGreensDClassOfElement[102X (for a free band and element)  10.5-1
  [2XGreensDClassOfElement[102X  12.1-2
  [2XGreensDClassOfElementNC[102X  12.1-3
  [2XGreensHClasses[102X  12.1-4
  [2XGreensHClassOfElement[102X  12.1-2
  [2XGreensHClassOfElement[102X (for a Rees matrix semigroup)  12.1-2
  [2XGreensHClassOfElementNC[102X  12.1-3
  [2XGreensJClasses[102X  12.1-4
  [2XGreensLClasses[102X  12.1-4
  [2XGreensLClassOfElement[102X  12.1-2
  [2XGreensLClassOfElementNC[102X  12.1-3
  [2XGreensRClasses[102X  12.1-4
  [2XGreensRClassOfElement[102X  12.1-2
  [2XGreensRClassOfElementNC[102X  12.1-3
  [2XGroupHClass[102X  12.4-1
  [2XGroupOfUnits[102X  13.8-1
  [2XHallMonoid[102X  8.6-4
  [2XHClass[102X  12.1-2
  [2XHClass[102X (for a Rees matrix semigroup)  12.1-2
  [2XHClasses[102X  12.1-4
  [2XHClassNC[102X  12.1-3
  [2XHClassReps[102X  12.1-5
  [2XIdempotentGeneratedSubsemigroup[102X  13.9-3
  [2XIdempotents[102X  13.9-1
  [2XIdentityBipartition[102X  3.2-3
  [2XIdentityMatrixOverFiniteField[102X (for a finite field and a pos int)  5.4-2
  [2XIdentityMatrixOverFiniteField[102X (for a matrix over finite field and pos int)  5.4-2
  [2XIdentityPBR[102X  4.2-4
  [2XImagesElm[102X (for IsRMSIsoByTriple)  17.2-5
  [2XImagesRepresentative[102X (for IsRMSIsoByTriple)  17.2-5
  [2XIndexPeriodOfSemigroupElement[102X  13.4-1
  [2XInfoSemigroups[102X  2.6-1
  [2XInjectionNormalizedPrincipalFactor[102X  12.4-7
  [2XInjectionPrincipalFactor[102X  12.4-7
  [2XIntRepOfBipartition[102X  3.5-4
  [2XInverseMonoidByGenerators[102X  6.2-1
  [2XInverseOp[102X (for an integer matrix)  5.5-1
  [2XInverseOp[102X  5.6-1
  [2XInverseSemigroupByGenerators[102X  6.2-1
  [2XInverseSemigroupCongruenceByKernelTrace[102X  16.7-2
  [2XInverseSubsemigroupByProperty[102X  6.4-3
  [2XIrredundantGeneratingSubset[102X  13.6-3
  [2XIsActingSemigroup[102X  6.1-3
  [2XIsAntiSymmetricBooleanMat[102X  5.3-13
  [2XIsAperiodicSemigroup[102X  14.1-18
  [2XIsBand[102X  14.1-1
  [2XIsBipartition[102X  3.1-1
  [2XIsBipartitionCollColl[102X  3.1-2
  [2XIsBipartitionCollection[102X  3.1-2
  [2XIsBipartitionMonoid[102X  3.8-1
  [2XIsBipartitionPBR[102X  4.5-8
  [2XIsBipartitionSemigroup[102X  3.8-1
  [2XIsBlockBijection[102X  3.5-16
  [2XIsBlockBijectionMonoid[102X  3.8-2
  [2XIsBlockBijectionPBR[102X  4.5-8
  [2XIsBlockBijectionSemigroup[102X  3.8-2
  [2XIsBlockGroup[102X  14.1-2
  [2XIsBlocks[102X  3.6-1
  [2XIsBooleanMat[102X  5.1-8
  [2XIsBooleanMatCollColl[102X  5.1-9
  [2XIsBooleanMatCollection[102X  5.1-9
  [2XIsBooleanMatMonoid[102X  5.7-2
  [2XIsBooleanMatSemigroup[102X  5.7-1
  [2XIsBrandtSemigroup[102X  15.2-2
  [2XIsCliffordSemigroup[102X  15.2-1
  [2XIsColTrimBooleanMat[102X  5.3-9
  [2XIsCombinatorialSemigroup[102X  14.1-18
  [2XIsCommutativeSemigroup[102X  14.1-3
  [2XIsCompletelyRegularSemigroup[102X  14.1-4
  [2XIsCompletelySimpleSemigroup[102X  14.1-21
  [2XIsCongruenceClass[102X  16.3-1
  [2XIsCongruenceFreeSemigroup[102X  14.1-5
  [2XIsCongruencePoset[102X  16.4-4
  [2XIsConnectedTransformationSemigroup[102X (for a transformation semigroup)  13.12-10
  [2XIsDTrivial[102X  14.1-18
  [2XIsDualTransBipartition[102X  3.5-13
  [2XIsDualTransformationPBR[102X  4.5-10
  [2XIsEmptyPBR[102X  4.5-5
  [2XIsEnumerableSemigroupRep[102X  6.1-4
  [2XIsEquivalenceBooleanMat[102X  5.3-16
  [2XIsEUnitaryInverseSemigroup[102X  15.2-3
  [2XIsFactorisableInverseMonoid[102X  15.2-4
  [2XIsFinite[102X  5.7-3
  [2XIsFreeBand[102X (for a given semigroup)  10.4-3
  [2XIsFreeBandCategory[102X  10.4-2
  [2XIsFreeBandElement[102X  10.4-4
  [2XIsFreeBandElementCollection[102X  10.4-5
  [2XIsFreeBandSubsemigroup[102X  10.4-6
  [2XIsFreeInverseSemigroup[102X  10.1-3
  [2XIsFreeInverseSemigroupCategory[102X  10.1-2
  [2XIsFreeInverseSemigroupElement[102X  10.1-4
  [2XIsFreeInverseSemigroupElementCollection[102X  10.1-5
  [2XIsFullMatrixMonoid[102X  8.5-3
  [2XIsFullyEnumerated[102X  13.1-4
  [2XIsGeneralLinearMonoid[102X  8.5-3
  [2XIsGraphInverseSemigroup[102X  11.1-4
  [2XIsGraphInverseSemigroupElement[102X  11.1-4
  [2XIsGraphInverseSemigroupElementCollection[102X  11.1-6
  [2XIsGraphInverseSubsemigroup[102X  11.1-7
  [2XIsGreensClassNC[102X  12.3-3
  [2XIsGreensDGreaterThanFunc[102X  12.1-12
  [2XIsGroupAsSemigroup[102X  14.1-6
  [2XIsHTrivial[102X  14.1-18
  [2XIsIdempotentGenerated[102X  14.1-7
  [2XIsIdentityPBR[102X  4.5-6
  [2XIsIntegerMatrix[102X  5.1-8
  [2XIsIntegerMatrixCollColl[102X  5.1-9
  [2XIsIntegerMatrixCollection[102X  5.1-9
  [2XIsIntegerMatrixMonoid[102X  5.7-2
  [2XIsIntegerMatrixSemigroup[102X  5.7-1
  [2XIsInverseSemigroupCongruenceByKernelTrace[102X  16.7-1
  [2XIsInverseSemigroupCongruenceClassByKernelTrace[102X  16.7-6
  [2XIsIsomorphicSemigroup[102X  17.1-1
  [2XIsJoinIrreducible[102X  15.2-5
  [2XIsLeftCongruenceClass[102X  16.3-2
  [2XIsLeftSemigroupCongruence[102X  16.1-2
  [2XIsLeftSimple[102X  14.1-8
  [2XIsLeftZeroSemigroup[102X  14.1-9
  [2XIsLinkedTriple[102X  16.6-5
  [2XIsLTrivial[102X  14.1-18
  [2XIsMajorantlyClosed[102X  15.2-6
  [2XIsMatrixOverFiniteField[102X  5.1-8
  [2XIsMatrixOverFiniteFieldCollColl[102X  5.1-9
  [2XIsMatrixOverFiniteFieldCollection[102X  5.1-9
  [2XIsMatrixOverFiniteFieldGroup[102X  5.7-7
  [2XIsMatrixOverFiniteFieldMonoid[102X  5.7-2
  [2XIsMatrixOverFiniteFieldSemigroup[102X  5.7-1
  [2XIsMatrixOverSemiring[102X  5.1-1
  [2XIsMatrixOverSemiringCollColl[102X  5.1-2
  [2XIsMatrixOverSemiringCollection[102X  5.1-2
  [2XIsMatrixOverSemiringMonoid[102X  5.7-2
  [2XIsMatrixOverSemiringSemigroup[102X  5.7-1
  [2XIsMaximalSubsemigroup[102X  13.10-3
  [2XIsMaxPlusMatrix[102X  5.1-8
  [2XIsMaxPlusMatrixCollColl[102X  5.1-9
  [2XIsMaxPlusMatrixCollection[102X  5.1-9
  [2XIsMaxPlusMatrixMonoid[102X  5.7-2
  [2XIsMaxPlusMatrixSemigroup[102X  5.7-1
  [2XIsMinPlusMatrix[102X  5.1-8
  [2XIsMinPlusMatrixCollColl[102X  5.1-9
  [2XIsMinPlusMatrixCollection[102X  5.1-9
  [2XIsMinPlusMatrixMonoid[102X  5.7-2
  [2XIsMinPlusMatrixSemigroup[102X  5.7-1
  [2XIsMonogenicInverseMonoid[102X  15.2-8
  [2XIsMonogenicInverseSemigroup[102X  15.2-7
  [2XIsMonogenicMonoid[102X  14.1-11
  [2XIsMonogenicSemigroup[102X  14.1-10
  [2XIsMonoidAsSemigroup[102X  14.1-12
  [2XIsNTPMatrix[102X  5.1-8
  [2XIsNTPMatrixCollColl[102X  5.1-9
  [2XIsNTPMatrixCollection[102X  5.1-9
  [2XIsNTPMatrixMonoid[102X  5.7-2
  [2XIsNTPMatrixSemigroup[102X  5.7-1
  [2XIsomorphismMatrixGroup[102X  5.7-9
  [2XIsomorphismMonoid[102X  6.5-2
  [2XIsomorphismPermGroup[102X  6.5-5
  [2XIsomorphismReesMatrixSemigroup[102X (for a D-class)  12.4-7
  [2XIsomorphismReesMatrixSemigroup[102X (for a semigroup)  13.15-1
  [2XIsomorphismReesMatrixSemigroupOverPermGroup[102X  13.15-1
  [2XIsomorphismReesZeroMatrixSemigroup[102X  13.15-1
  [2XIsomorphismReesZeroMatrixSemigroupOverPermGroup[102X  13.15-1
  [2XIsomorphismSemigroup[102X  6.5-1
  [2XIsomorphismSemigroups[102X  17.1-3
  [2XIsOntoBooleanMat[102X  5.3-14
  [2XIsOrthodoxSemigroup[102X  14.1-13
  [2XIsPartialOrderBooleanMat[102X  5.3-15
  [2XIsPartialPermBipartition[102X  3.5-15
  [2XIsPartialPermBipartitionMonoid[102X  3.8-3
  [2XIsPartialPermBipartitionSemigroup[102X  3.8-3
  [2XIsPartialPermPBR[102X  4.5-11
  [2XIsPBR[102X  4.1-1
  [2XIsPBRCollColl[102X  4.1-2
  [2XIsPBRCollection[102X  4.1-2
  [2XIsPBRMonoid[102X  4.6-1
  [2XIsPBRSemigroup[102X  4.6-1
  [2XIsPermBipartition[102X  3.5-14
  [2XIsPermBipartitionGroup[102X  3.8-4
  [2XIsPermPBR[102X  4.5-12
  [2XIsRectangularBand[102X  14.1-14
  [2XIsRectangularGroup[102X  14.1-15
  [2XIsReesCongruenceClass[102X  16.8-2
  [2XIsReflexiveBooleanMat[102X  5.3-11
  [2XIsRegularGreensClass[102X  12.3-2
  [2XIsRegularSemigroup[102X  14.1-16
  [2XIsRightCongruenceClass[102X  16.3-3
  [2XIsRightSemigroupCongruence[102X  16.1-3
  [2XIsRightSimple[102X  14.1-8
  [2XIsRightZeroSemigroup[102X  14.1-17
  [2XIsRMSCongruenceByLinkedTriple[102X  16.6-1
  [2XIsRMSCongruenceClassByLinkedTriple[102X  16.6-3
  [2XIsRMSIsoByTriple[102X  17.2-1
  [2XIsRowTrimBooleanMat[102X  5.3-9
  [2XIsRTrivial[102X  14.1-18
  [2XIsRZMSCongruenceByLinkedTriple[102X  16.6-1
  [2XIsRZMSCongruenceClassByLinkedTriple[102X  16.6-3
  [2XIsRZMSIsoByTriple[102X  17.2-1
  [2XIsSemiband[102X  14.1-7
  [2XIsSemigroupCongruence[102X  16.1-1
  [2XIsSemigroupWithAdjoinedZero[102X  14.1-19
  [2XIsSemilattice[102X  14.1-20
  [2XIsSimpleSemigroup[102X  14.1-21
  [2XIsSubrelation[102X  16.5-1
  [2XIsSuperrelation[102X  16.5-2
  [2XIsSymmetricBooleanMat[102X  5.3-10
  [2XIsSynchronizingSemigroup[102X (for a transformation semigroup and a positive integer)  14.1-22
  [2XIsSynchronizingSemigroup[102X (for a transformation semigroup)  14.1-22
  [2XIsTorsion[102X (for an integer matrix)  5.5-2
  [2XIsTorsion[102X  5.7-4
  [2XIsTotalBooleanMat[102X  5.3-14
  [2XIsTransBipartition[102X  3.5-12
  [2XIsTransformationPBR[102X  4.5-9
  [2XIsTransitive[102X (for a transformation
      semigroup and a pos int)  13.12-7
  [2XIsTransitive[102X (for a transformation
      semigroup and a set)  13.12-7
  [2XIsTransitiveBooleanMat[102X  5.3-12
  [2XIsTrimBooleanMat[102X  5.3-9
  [2XIsTropicalMatrix[102X  5.1-8
  [2XIsTropicalMatrixCollection[102X  5.1-9
  [2XIsTropicalMatrixMonoid[102X  5.7-2
  [2XIsTropicalMatrixSemigroup[102X  5.7-1
  [2XIsTropicalMaxPlusMatrix[102X  5.1-8
  [2XIsTropicalMaxPlusMatrixCollColl[102X  5.1-9
  [2XIsTropicalMaxPlusMatrixCollection[102X  5.1-9
  [2XIsTropicalMaxPlusMatrixMonoid[102X  5.7-2
  [2XIsTropicalMaxPlusMatrixSemigroup[102X  5.7-1
  [2XIsTropicalMinPlusMatrix[102X  5.1-8
  [2XIsTropicalMinPlusMatrixCollColl[102X  5.1-9
  [2XIsTropicalMinPlusMatrixCollection[102X  5.1-9
  [2XIsTropicalMinPlusMatrixMonoid[102X  5.7-2
  [2XIsTropicalMinPlusMatrixSemigroup[102X  5.7-1
  [2XIsUniformBlockBijection[102X  3.5-17
  [2XIsUnitRegularMonoid[102X  14.1-23
  [2XIsUniversalPBR[102X  4.5-7
  [2XIsUniversalSemigroupCongruence[102X  16.9-1
  [2XIsUniversalSemigroupCongruenceClass[102X  16.9-2
  [2XIsVertex[102X (for a graph inverse semigroup element)  11.1-3
  [2XIsZeroGroup[102X  14.1-24
  [2XIsZeroRectangularBand[102X  14.1-25
  [2XIsZeroSemigroup[102X  14.1-26
  [2XIsZeroSimpleSemigroup[102X  14.1-27
  [2XIteratorCanonical[102X  13.1-1
  [2XIteratorFromOldGeneratorsFile[102X  19.1-3
  [2XIteratorFromPickledFile[102X  19.1-3
  [2XIteratorOfDClasses[102X  12.2-2
  [2XIteratorOfDClassReps[102X  12.2-1
  [2XIteratorOfHClasses[102X  12.2-2
  [2XIteratorOfHClassReps[102X  12.2-1
  [2XIteratorOfLClasses[102X  12.2-2
  [2XIteratorOfLClassReps[102X  12.2-1
  [2XIteratorOfRClasses[102X  12.2-2
  [2XIteratorOfRClassReps[102X  12.2-1
  [2XJClasses[102X  12.1-4
  [2XJoinIrreducibleDClasses[102X  15.1-2
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  [2XJoinRightSemigroupCongruences[102X  16.5-4
  [2XJoinSemigroupCongruences[102X  16.5-4
  [2XJoinSemilatticeOfCongruences[102X (for a congruence poset and a function)  16.4-10
  [2XJoinSemilatticeOfCongruences[102X (for a list or collection and a function)  16.4-10
  [2XJonesMonoid[102X  8.3-3
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  [2XLatticeOfCongruences[102X (for a semigroup)  16.4-5
  [2XLatticeOfLeftCongruences[102X (for a semigroup and a multiplicative element collection)  16.4-5
  [2XLatticeOfLeftCongruences[102X (for a semigroup)  16.4-5
  [2XLatticeOfRightCongruences[102X (for a semigroup and a multiplicative element collection)  16.4-5
  [2XLatticeOfRightCongruences[102X (for a semigroup)  16.4-5
  [2XLClass[102X  12.1-2
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  [2XLeftCongruencesOfSemigroup[102X (for a semigroup)  16.4-1
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  [2XMaximalSubsemigroups[102X (for a finite semigroup)  13.10-1
  [2XMeetSemigroupCongruences[102X  16.5-3
  [2XMinimalCongruences[102X (for a congruence poset)  16.4-11
  [2XMinimalCongruences[102X (for a list or collection)  16.4-11
  [2XMinimalCongruencesOfSemigroup[102X (for a semigroup and a multiplicative element collection)  16.4-2
  [2XMinimalCongruencesOfSemigroup[102X (for a semigroup)  16.4-2
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  [2XMinimalLeftCongruencesOfSemigroup[102X (for a semigroup)  16.4-2
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  [2XMinimalRightCongruencesOfSemigroup[102X (for a semigroup)  16.4-2
  [2XMinimalSemigroupGeneratingSet[102X  13.6-4
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  [2XMultiplicativeNeutralElement[102X (for an H-class)  12.4-5
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  [2XNonTrivialEquivalenceClasses[102X  16.3-6
  [2XNonTrivialLeftCongruenceClasses[102X  16.3-7
  [2XNonTrivialRightCongruenceClasses[102X  16.3-7
  [2XNormalizedPrincipalFactor[102X  12.4-8
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  [2XNormalizer[102X (for a semigroup, record)  13.11-1
  [2XNormalizeSemigroup[102X  5.7-5
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  [2XOnRightCongruenceClasses[102X  16.3-14
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  [2XPlanarUniformBlockBijectionMonoid[102X  8.3-8
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  [2XPOI[102X (monoid of order preserving partial perms)  8.2-3
  [2XPOPI[102X (monoid of orientation preserving partial perms)  8.2-3
  [2XPORI[102X (monoid of orientation preserving or reversing partial perms)  8.2-3
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  [2XPosetOfPrincipalCongruences[102X (for a semigroup)  16.4-6
  [2XPosetOfPrincipalLeftCongruences[102X (for a semigroup and a multiplicative element collection)  16.4-6
  [2XPosetOfPrincipalLeftCongruences[102X (for a semigroup)  16.4-6
  [2XPosetOfPrincipalRightCongruences[102X (for a semigroup and a multiplicative element collection)  16.4-6
  [2XPosetOfPrincipalRightCongruences[102X (for a semigroup)  16.4-6
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  [2XPrincipalCongruencesOfSemigroup[102X (for a semigroup)  16.4-3
  [2XPrincipalFactor[102X  12.4-8
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  [2XPrincipalLeftCongruencesOfSemigroup[102X (for a semigroup)  16.4-3
  [2XPrincipalRightCongruencesOfSemigroup[102X (for a semigroup and a multiplicative element collection)  16.4-3
  [2XPrincipalRightCongruencesOfSemigroup[102X (for a semigroup)  16.4-3
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  [2XRepresentativeOfMinimalDClass[102X  13.7-2
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  [2XRightCongruencesOfSemigroup[102X (for a semigroup)  16.4-1
  [2XRightCosetsOfInverseSemigroup[102X  15.1-6
  [2XRightInverse[102X (for a matrix over finite field)  5.4-6
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  [2XRightProjection[102X  3.2-5
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  [2XRMSCongruenceByLinkedTriple[102X  16.6-2
  [2XRMSCongruenceClassByLinkedTriple[102X  16.6-4
  [2XRMSIsoByTriple[102X  17.2-2
  [2XRMSNormalization[102X  6.5-7
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  [2XRookPartitionMonoid[102X  8.3-1
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  [2XRowSpaceTransformation[102X (for a matrix over finite field)  5.4-4
  [2XRowSpaceTransformationInv[102X (for a matrix over finite field)  5.4-4
  [2XRZMSCongruenceByLinkedTriple[102X  16.6-2
  [2XRZMSCongruenceClassByLinkedTriple[102X  16.6-4
  [2XRZMSConnectedComponents[102X  13.14-2
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  [2XRZMSIsoByTriple[102X  17.2-2
  [2XRZMSNormalization[102X  6.5-6
  [2XSameMinorantsSubgroup[102X  15.1-7
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  [2XSemigroupCongruence[102X  16.2-1
  [2XSemigroupIdeal[102X  7.1-1
  [2XSemigroupIdealOfReesCongruence[102X  16.8-1
  [5XSemigroups[105X package overview  1.
  [2XSEMIGROUPS.DefaultOptionsRec[102X  6.3-1
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  [2XSingularApsisMonoid[102X  8.3-11
  [2XSingularBrauerMonoid[102X  8.3-2
  [2XSingularCrossedApsisMonoid[102X  8.3-11
  [2XSingularDualSymmetricInverseMonoid[102X  8.3-7
  [2XSingularFactorisableDualSymmetricInverseMonoid[102X  8.3-8
  [2XSingularJonesMonoid[102X  8.3-3
  [2XSingularModularPartitionMonoid[102X  8.3-10
  [2XSingularOrderEndomorphisms[102X  8.1-5
  [2XSingularPartitionMonoid[102X  8.3-1
  [2XSingularPlanarModularPartitionMonoid[102X  8.3-10
  [2XSingularPlanarPartitionMonoid[102X  8.3-9
  [2XSingularPlanarUniformBlockBijectionMonoid[102X  8.3-8
  [2XSingularTransformationMonoid[102X  8.1-4
  [2XSingularTransformationSemigroup[102X  8.1-4
  [2XSingularUniformBlockBijectionMonoid[102X  8.3-8
  [2XSLM[102X  8.5-2
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  [2XSmallestIdempotentPower[102X  13.4-2
  [2XSmallestMultiplicationTable[102X  17.1-2
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  [2XSmallInverseMonoidGeneratingSet[102X  13.6-2
  [2XSmallInverseSemigroupGeneratingSet[102X  13.6-2
  [2XSmallMonoidGeneratingSet[102X  13.6-2
  [2XSmallSemigroupGeneratingSet[102X  13.6-2
  [2XSource[102X (for a graph inverse semigroup element)  11.1-2
  [2XSpecialLinearMonoid[102X  8.5-2
  [2XSpectralRadius[102X  5.6-3
  [2XSplash[102X  18.1-1
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  [2XStar[102X (for a PBR)  4.5-1
  [2XStarOp[102X (for a bipartition)  3.2-6
  [2XStarOp[102X (for a PBR)  4.5-1
  [2XStructureDescription[102X (for an H-class)  12.4-6
  [2XStructureDescriptionMaximalSubgroups[102X  12.4-4
  [2XStructureDescriptionSchutzenbergerGroups[102X  12.4-3
  [2XSubsemigroupByProperty[102X (for a semigroup and function)  6.4-2
  [2XSubsemigroupByProperty[102X (for a semigroup, function, and limit on the size of the subsemigroup)  6.4-2
  [2XSuccessors[102X  5.3-5
  [2XSupersemigroupOfIdeal[102X  7.2-3
  [2XTemperleyLiebMonoid[102X  8.3-3
  [2XTexString[102X  18.3-1
  [2XThresholdNTPMatrix[102X  5.1-12
  [2XThresholdTropicalMatrix[102X  5.1-11
  [2XTikzString[102X  18.4-1
  [2XTraceOfSemigroupCongruence[102X  16.7-5
  [2XTransposedMatImmutable[102X (for a matrix over finite field)  5.4-8
  [2XTriangularBooleanMatMonoid[102X  8.6-6
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  [2XUnderlyingSemigroupOfCongruencePoset[102X  16.4-8
  [2XUnderlyingSemigroupOfSemigroupWithAdjoinedZero[102X  13.7-4
  [2XUniformBlockBijectionMonoid[102X  8.3-8
  [2XUnitriangularBooleanMatMonoid[102X  8.6-6
  [2XUniversalPBR[102X  4.2-5
  [2XUniversalSemigroupCongruence[102X  16.9-3
  [2XUnweightedPrecedenceDigraph[102X  5.6-4
  [2XVagnerPrestonRepresentation[102X  15.1-9
  [2XWriteGenerators[102X  19.1-2
  [2XZeroSemigroup[102X  9.1-4
  
  
  -------------------------------------------------------
