  
  
  [1XIndex[101X
  
  [2XAnnihilator[102X (for IsLeftOrRightPresentation)  1.3-11
  [2XAsLeftOrRightPresentation[102X  1.3-6
  [2XAsLeftPresentation[102X (for IsHomalgMatrix)  1.3-4
  [2XAsMorphismBetweenFreeLeftPresentations[102X (for IsHomalgMatrix)  1.3-2
  [2XAsMorphismBetweenFreeRightPresentations[102X (for IsHomalgMatrix)  1.3-3
  [2XAsRightPresentation[102X (for IsHomalgMatrix)  1.3-5
  [2XCoverByFreeModule[102X (for IsLeftOrRightPresentation)  1.5-2
  [2XFreeLeftPresentation[102X (for IsInt, IsHomalgRing)  1.3-7
  [2XFreeRightPresentation[102X (for IsInt, IsHomalgRing)  1.3-8
  [2XFunctorDoubleDualLeft[102X (for IsHomalgRing)  1.1-9
  [2XFunctorDoubleDualRight[102X (for IsHomalgRing)  1.1-10
  [2XFunctorDualLeft[102X (for IsHomalgRing)  1.1-7
  [2XFunctorDualRight[102X (for IsHomalgRing)  1.1-8
  [2XFunctorGetRidOfZeroGeneratorsLeft[102X (for IsHomalgRing)  1.1-3
  [2XFunctorGetRidOfZeroGeneratorsRight[102X (for IsHomalgRing)  1.1-4
  [2XFunctorLessGeneratorsLeft[102X (for IsHomalgRing)  1.1-5
  [2XFunctorLessGeneratorsRight[102X (for IsHomalgRing)  1.1-6
  [2XFunctorStandardModuleLeft[102X (for IsHomalgRing)  1.1-1
  [2XFunctorStandardModuleRight[102X (for IsHomalgRing)  1.1-2
  [2XIsLeftOrRightPresentation[102X (for IsCapCategoryObject)  1.2-4
  [2XIsLeftOrRightPresentationMorphism[102X (for IsCapCategoryMorphism)  1.2-1
  [2XIsLeftPresentation[102X (for IsLeftOrRightPresentation)  1.2-5
  [2XIsLeftPresentationMorphism[102X (for IsLeftOrRightPresentationMorphism)  1.2-2
  [2XIsRightPresentation[102X (for IsLeftOrRightPresentation)  1.2-6
  [2XIsRightPresentationMorphism[102X (for IsLeftOrRightPresentationMorphism)  1.2-3
  [2XLeftPresentations[102X (for IsHomalgRing)  1.3-12
  [2XNaturalIsomorphismFromIdentityToGetRidOfZeroGeneratorsLeft[102X (for IsHomalgRing)  1.6-3
  [2XNaturalIsomorphismFromIdentityToGetRidOfZeroGeneratorsRight[102X (for IsHomalgRing)  1.6-4
  [2XNaturalIsomorphismFromIdentityToLessGeneratorsLeft[102X (for IsHomalgRing)  1.6-5
  [2XNaturalIsomorphismFromIdentityToLessGeneratorsRight[102X (for IsHomalgRing)  1.6-6
  [2XNaturalIsomorphismFromIdentityToStandardModuleLeft[102X (for IsHomalgRing)  1.6-1
  [2XNaturalIsomorphismFromIdentityToStandardModuleRight[102X (for IsHomalgRing)  1.6-2
  [2XNaturalTransformationFromIdentityToDoubleDualLeft[102X (for IsHomalgRing)  1.6-7
  [2XNaturalTransformationFromIdentityToDoubleDualRight[102X (for IsHomalgRing)  1.6-8
  [2XPresentationMorphism[102X (for IsLeftOrRightPresentation, IsHomalgMatrix, IsLeftOrRightPresentation)  1.3-1
  [2XRightPresentations[102X (for IsHomalgRing)  1.3-13
  [2XStandardGeneratorMorphism[102X (for IsLeftOrRightPresentation, IsInt)  1.5-1
  [2XUnderlyingHomalgRing[102X (for IsLeftOrRightPresentation)  1.3-10
  [2XUnderlyingHomalgRing[102X (for IsLeftOrRightPresentationMorphism)  1.4-1
  [2XUnderlyingMatrix[102X (for IsLeftOrRightPresentation)  1.3-9
  [2XUnderlyingMatrix[102X (for IsLeftOrRightPresentationMorphism)  1.4-2
  
  
  -------------------------------------------------------
