\[\]
, for IsStrongExceptionalCollection, IsInt 1.1-18 AdditiveClosure
, for IsStrongExceptionalCollection 1.1-14 AdditiveClosureAsFullSubcategory
, for IsCapFullSubcategory 1.2-8 Algebroid
, for IsStrongExceptionalCollection 1.1-9 AllPaths
, for IsStrongExceptionalCollection, IsList 1.1-22 AmbientCategory
, for IsStrongExceptionalCollection 1.1-5 Arrows
, for IsStrongExceptionalCollection, IsInt, IsInt 1.1-21 BasisOfPaths
, for IsStrongExceptionalCollection, IsList 1.1-23 CategoryOfQuiverRepresentationsOverOppositeAlgebra
, for IsStrongExceptionalCollection 1.1-15 CounitOfTensorHomAdjunction
, for IsStrongExceptionalCollection, IsCapFunctor, IsCapFunctor 2.2-2 CreateStrongExceptionalCollection
, for IsCapFullSubcategory, IsList, IsList, IsString 1.1-2 DecompositionFunctorOfInjectiveQuiverRepresentations
, for IsQuiverRepresentationCategory 2.1-3 DecompositionFunctorOfProjectiveQuiverRepresentations
, for IsQuiverRepresentationCategory 2.1-1 DefiningStrongExceptionalCollection
, for IsQuiverAlgebra 1.1-8 EndomorphismAlgebra
, for IsStrongExceptionalCollection 1.1-7 EndomorphismAlgebraAttr
, for IsStrongExceptionalCollection 1.1-6 FullSubcategory
, for IsStrongExceptionalCollection 1.1-4 FullSubcategoryGeneratedByIndecInjectiveObjects
, for IsCapCategory 1.2-7 FullSubcategoryGeneratedByIndecProjectiveObjects
, for IsCapCategory 1.2-6 FullSubcategoryGeneratedByInjectiveObjects
, for IsCapCategory 1.2-5 FullSubcategoryGeneratedByProjectiveObjects
, for IsCapCategory 1.2-4 HomFunctorToCategoryOfQuiverRepresentations
, for IsStrongExceptionalCollection 3.1-1 HomFunctorToCategoryOfQuiverRepresentationsOnIndecInjectiveObjects
, for IsStrongExceptionalCollection 3.1-2 HomFunctorToCategoryOfQuiverRepresentationsOnInjectiveObjects
, for IsStrongExceptionalCollection 3.1-3 HomotopyCategory
, for IsStrongExceptionalCollection 1.1-16 InterpretListOfMorphismsAsOneMorphismInRangeCategoryOfHomomorphismStructure
, for IsCapCategoryObject, IsCapCategoryObject, IsList 1.2-1 InverseOfYonedaIsomorphismOntoFullSubcategoryOfCategoryOfQuiverRepresentations
, for IsAlgebroid 2.1-10 IsomorphismFromAlgebroid
, for IsStrongExceptionalCollection 2.1-6 IsomorphismOntoAlgebroid
, for IsStrongExceptionalCollection 2.1-5 IsStrongExceptionalCollection
, for IsObject 1.1-1 LabelsForAllPaths
, for IsStrongExceptionalCollection, IsList 1.1-26 LabelsForBasisOfPaths
, for IsStrongExceptionalCollection, IsList 1.1-27 LabelsForPathsOfLengthGreaterThanOne
, for IsStrongExceptionalCollection, IsList 1.1-25 LabelsForPathsOfLengthOne
, for IsStrongExceptionalCollection, IsList 1.1-24 LeftDerivedFunctor
, for IsCapFunctor, IsBool 2.1-13 LocalizationFunctor
, for IsHomotopyCategory 2.1-11 NumberOfObjects
, for IsStrongExceptionalCollection 1.1-12 PathsOfLengthGreaterThanOne
, for IsStrongExceptionalCollection, IsList 1.1-19 PathsOfLengthOne
, for IsStrongExceptionalCollection, IsList 1.1-20 QuasiInverseOfDecompositionFunctorOfInjectiveQuiverRepresentations
, for IsQuiverRepresentationCategory 2.1-4 QuasiInverseOfDecompositionFunctorOfProjectiveQuiverRepresentations
, for IsQuiverRepresentationCategory 2.1-2 QuiverRows
, for IsStrongExceptionalCollection 1.1-10 RandomQuiverAlgebraWhoseIndecProjectiveRepsAreStrongExceptionalCollection
1.2-2 RelationsBetweenMorphisms
1.2-3 RightDerivedFunctor
, for IsCapFunctor, IsBool 2.1-14 StrongExceptionalCollection
, for IsCapFullSubcategory 1.1-3 TensorFunctorFromCategoryOfQuiverRepresentations
, for IsStrongExceptionalCollection 2.1-15 TensorFunctorFromCategoryOfQuiverRepresentationsOnIndecProjectiveObjects
, for IsStrongExceptionalCollection 2.1-16 TensorFunctorFromCategoryOfQuiverRepresentationsOnProjectiveObjects
, for IsStrongExceptionalCollection 2.1-17 TiltingObject
, for IsStrongExceptionalCollection 1.1-11 UnderlyingObjects
, for IsStrongExceptionalCollection 1.1-13 UnitOfTensorHomAdjunction
, for IsStrongExceptionalCollection, IsCapFunctor, IsCapFunctor 2.2-1 UniversalFunctorFromDerivedCategory
, for IsCapFunctor 2.1-12 YonedaIsomorphismOntoFullSubcategoryOfCategoryOfQuiverRepresentations
, for IsAlgebroid 2.1-7
generated by GAPDoc2HTML