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Subindex: Coercion-spaces  ..    CollineationGSet




Coercion-spaces

   ModSym_Coercion-spaces (Example H94E10)


coercions

   Class Group Coercions (BINARY QUADRATIC FORMS)


Coheight

   K3Coheight(X) : GrphVert -> RngIntElt


Cohen

   IsCohenMacaulay(R) : RngInvar -> BoolElt


coho-example

   GrpCoh_coho-example (Example H23E2)


coho-module1

   GrpCoh_coho-module1 (Example H23E1)


Cohomological

   CohomologicalDimension(G, M, i) : GrpFin, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(G, M, i) : GrpPerm, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(G, M, n) : GrpPerm, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(CM, n) : ModCoho, RngIntElt -> RngIntElt


CohomologicalDimension

   CohomologicalDimension(G, M, i) : GrpFin, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(G, M, i) : GrpPerm, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(G, M, n) : GrpPerm, ModRng, RngIntElt -> RngIntElt

   CohomologicalDimension(CM, n) : ModCoho, RngIntElt -> RngIntElt


Cohomology

   CohomologyGeneratorToChainMap(P,Q,C,n) : ModCpx, ModCpx, Tup, RngIntElt -> MapChn

   CohomologyGeneratorToChainMap(P,C,n) : ModCpx, Tup, RngIntElt -> MapChn

   CohomologyGroup(CM, n) : ModCoho, RngIntElt -> ModTupRng

   CohomologyLeftModuleGenerators(P, CP, Q) : Tup, Tup, Tup -> Tup

   CohomologyModule(G, M) : GrpPerm, ModGrp -> ModCoho

   CohomologyModule(G, invar, mats) : GrpPerm, SeqEnum, SeqEnum -> ModCoho

   CohomologyRightModuleGenerators(P, Q, CQ) : Tup, Tup, Tup -> Tup

   CohomologyRingGenerators(P) : Tup -> Tup

   DegreesOfCohomologyGenerators(C) : Tup -> SeqEnum

   SimpleCohomologyDimensions(M) : ModAlg -> SeqEnum

   AlgBas_Cohomology (Example H76E5)

   GrpPerm_Cohomology (Example H17E30)


cohomology

   Calculating Cohomology (COHOMOLOGY)

   COHOMOLOGY

   Cohomology (BASIC ALGEBRAS)

   Cohomology (FINITELY PRESENTED ABELIAN GROUPS)

   Cohomology (GROUPS)

   Cohomology (PERMUTATION GROUPS)


cohomology-groups

   Calculating Cohomology (COHOMOLOGY)


CohomologyGeneratorToChainMap

   CohomologyGeneratorToChainMap(P,Q,C,n) : ModCpx, ModCpx, Tup, RngIntElt -> MapChn

   CohomologyGeneratorToChainMap(P,C,n) : ModCpx, Tup, RngIntElt -> MapChn


CohomologyGroup

   CohomologyGroup(CM, n) : ModCoho, RngIntElt -> ModTupRng


CohomologyLeftModuleGenerators

   CohomologyLeftModuleGenerators(P, CP, Q) : Tup, Tup, Tup -> Tup


CohomologyModule

   CohomologyModule(G, M) : GrpPerm, ModGrp -> ModCoho

   CohomologyModule(G, invar, mats) : GrpPerm, SeqEnum, SeqEnum -> ModCoho


CohomologyRightModuleGenerators

   CohomologyRightModuleGenerators(P, Q, CQ) : Tup, Tup, Tup -> Tup


CohomologyRingGenerators

   CohomologyRingGenerators(P) : Tup -> Tup


Coisogeny

   CoisogenyGroup( G ) : GrpLie -> RootDtm

   CoisogenyGroup( W ) : GrpMat -> GrpAb, Map

   CoisogenyGroup( W ) : GrpPermCox -> GrpAb

   CoisogenyGroup( R ) : RootDtm -> GrpAb, Map


CoisogenyGroup

   CoisogenyGroup( G ) : GrpLie -> RootDtm

   CoisogenyGroup( W ) : GrpMat -> GrpAb, Map

   CoisogenyGroup( W ) : GrpPermCox -> GrpAb

   CoisogenyGroup( R ) : RootDtm -> GrpAb, Map


Cokernel

   Cokernel(f) : ModMatCpxElt -> ModCpx, ModMatCpxElt

   Cokernel(a) : ModMatElt -> ModTupFld

   Cokernel(f) : ModMatFldElt -> ModAlg,ModMatFldElt

   Cokernel(a) : ModMatRngElt -> ModTupRng


Collect

   Collect(P, Q) : Process(pQuot), [ <RngIntElt, RngIntElt> ] -> [ RngIntElt ] ->

   CollectRelations(~P) : Process(pQuot) ->


Collector

   DeleteSplitCollector(SQP) : SQProc, RngIntElt ->

   DeleteNonsplitCollector(SQP) : SQProc, RngIntElt ->

   DeleteCollector(SQP) : SQProc, RngIntElt ->

   DeleteCollector(SQP, p) : SQProc, RngIntElt ->

   NonsplitCollector(SQP, p) : SQProc, RngIntElt ->

   PrintCollector(SQP) : SQProc ->


collector

   DeleteSplitCollector(SQP) : SQProc, RngIntElt ->

   DeleteNonsplitCollector(SQP) : SQProc, RngIntElt ->

   Symbolic Collector (FINITELY PRESENTED GROUPS: ADVANCED)


CollectRelations

   CollectRelations(~P) : Process(pQuot) ->


Collinear

   IsCollinear(P, S) : Plane, { PlanePt } -> BoolElt, PlaneLn


Collineation

   CentralCollineationGroup(P, l) : Plane, PlaneLn -> GrpPerm, PowMap, Map

   CentralCollineationGroup(P, p) : Plane, PlanePt -> GrpPerm, PowMap, Map

   CentralCollineationGroup(P, p, l) : Plane, PlanePt, PlaneLn -> GrpPerm, PowMap, Map

   CollineationGroup(P) : Plane -> GrpPerm, GSet, GSet, PowMap, Map

   CollineationGroupStabilizer(P, k) : Plane, RngIntElt -> GrpPerm, GSet, GSet, PowMap, Map

   CollineationSubgroup(P) : Plane -> GrpPerm, GSet, GSet, PowMap, Map

   IsCentralCollineation(P, g) : Plane, GrpPermElt -> BoolElt, PlanePt, PlaneLn

   Plane_Collineation (Example H105E13)


collineation

   The Collineation Group of a Plane (FINITE PLANES)


collineation-group

   The Collineation Group of a Plane (FINITE PLANES)


CollineationGroup

   AutomorphismGroup(P) : Plane -> GrpPerm, GSet, GSet, PowMap, Map

   PointGroup(P) : Plane -> GrpPerm, GSet, GSet, PowMap, Map

   CollineationGroup(P) : Plane -> GrpPerm, GSet, GSet, PowMap, Map


CollineationGroupStabilizer

   CollineationGroupStabilizer(P, k) : Plane, RngIntElt -> GrpPerm, GSet, GSet, PowMap, Map


CollineationGSet

   Plane_CollineationGSet (Example H105E12)




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