Subindex: <B><B>special</B> .. Split</B>

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Subindex: special .. Split

special

   Abelian and p-Quotients (FINITE SOLUBLE GROUPS)
   Abelian, Nilpotent and Soluble Quotients (MATRIX GROUPS)
   Abelian, Nilpotent and Soluble Quotients (PERMUTATION GROUPS)
   Other Element Functions (RING OF INTEGERS)
   Other Special Functions (REAL AND COMPLEX FIELDS)
   Special forms of Curves (PLANE ALGEBRAIC CURVES)
   Special Functions for Ideals (QUADRATIC FIELDS)
   Special Lattices (LATTICES)
   Special Matrix Constructions (MATRICES)
   Special Options (REAL AND COMPLEX FIELDS)
   Special Presentations (FINITE SOLUBLE GROUPS)

special-ideals

Special Functions for Ideals (QUADRATIC FIELDS)

special-lattices

Special Lattices (LATTICES)

special-presentation

Special Presentations (FINITE SOLUBLE GROUPS)

Speciality

IndexOfSpeciality(D) : DivCrvElt -> RngIntElt
IndexOfSpeciality(D) : DivFunElt -> RngIntElt

SpecialLinearGroup

SL(arguments)
SpecialLinearGroup(arguments)

SpecialOrthogonalGroup

SO(arguments)
SpecialOrthogonalGroup(arguments)

SpecialOrthogonalGroupMinus

SOMinus(arguments)
SpecialOrthogonalGroupMinus(arguments)

SpecialOrthogonalGroupPlus

SOPlus(arguments)
SpecialOrthogonalGroupPlus(arguments)

SpecialPresentation

SpecialPresentation(G) : GrpPC -> GrpPC
GrpPC_SpecialPresentation (Example H19E24)

SpecialQuotient

GrpMat_SpecialQuotient (Example H18E18)
GrpPerm_SpecialQuotient (Example H17E17)

SpecialUnitaryGroup

SU(arguments)
SpecialUnitaryGroup(arguments)

SpecialWeights

SpecialWeights(G) : GrpPC -> [ <RngIntElt, RngIntElt, RngIntElt> ]

SpecialWords

GrpFPCox_SpecialWords (Example H83E8)

specific

Specific Factorization Algorithms (RING OF INTEGERS)
Tools for the calculation of specific normal series (FINITELY PRESENTED GROUPS: ADVANCED)

Spectrum

Spectrum(G) : GrphUnd -> SetEnum

Sphere

Sphere(u, n) : GrphVert, RngIntElt -> { GrphVert }
SpherePackingBound(K, n, d) : FldFin, RngIntElt, RngIntElt -> RngIntElt

SpherePackingBound

SpherePackingBound(K, n, d) : FldFin, RngIntElt, RngIntElt -> RngIntElt

Spinor

   SpinorRepresentatives(L) : Lat -> [ Lat ]
   Representatives(G) : SymGen -> [ Lat ]
   GenusRepresentatives(L) : Lat -> [ Lat ]
   IsSpinorGenus(G) : SymGen -> BoolElt
   IsSpinorNorm(G,p) : SymGen, RngIntElt -> RngIntElt
   SpinorCharacters(G) : SymGen -> [ GrpDrchElt ]
   SpinorGenera(G) : SymGen -> [ SymGen ]
   SpinorGenerators(G) : SymGen -> [ RngIntElt ]
   SpinorGenus(L) : Lat -> SymGen

SpinorCharacters

SpinorCharacters(G) : SymGen -> [ GrpDrchElt ]

SpinorGenera

SpinorGenera(G) : SymGen -> [ SymGen ]

SpinorGenerators

SpinorGenerators(G) : SymGen -> [ RngIntElt ]

SpinorGenus

SpinorGenus(L) : Lat -> SymGen

SpinorRepresentatives

   SpinorRepresentatives(L) : Lat -> [ Lat ]
   Representatives(G) : SymGen -> [ Lat ]
   GenusRepresentatives(L) : Lat -> [ Lat ]

Spiral

CoefficientsNonSpiral(s, n) : RngPowLazElt, [RngIntElt] -> SeqEnum

Splice

   MakeSpliceDiagram(g,e,a) : GrphDir,SeqEnum,SeqEnum -> GrphSpl
   MakeSpliceDiagram(e,l,a) : SeqEnum,SeqEnum,SeqEnum -> GrphSpl
   RegularSpliceDiagram(P) : PnclJac -> GrphSpl
   Splice(C, D) : ModCpx, ModCpx -> ModCpx
   Splice(C, D, f) : ModCpx, ModCpx, ModMatFldElt -> ModCpx
   SpliceDiagram(g) : GrphRes -> GrphSpl
   SpliceDiagram(g,v) : GrphRes,GrphResVert -> GrphSpl
   SpliceDiagram(v) : GrphSplVert -> GrphSpl
   SpliceDiagram(C,p) : Sch,Pt -> GrphSpl
   SpliceDiagramVertex(s,i) : GrphSpl,RngIntElt -> GrphSplVert

splice

Splice Diagrams (RESOLUTION GRAPHS AND SPLICE DIAGRAMS)
Splice Diagrams from Resolution Graphs (RESOLUTION GRAPHS AND SPLICE DIAGRAMS)

splice-diagrams

Splice Diagrams (RESOLUTION GRAPHS AND SPLICE DIAGRAMS)

SpliceDiagram

   SpliceDiagram(g) : GrphRes -> GrphSpl
   SpliceDiagram(g,v) : GrphRes,GrphResVert -> GrphSpl
   SpliceDiagram(v) : GrphSplVert -> GrphSpl
   SpliceDiagram(C,p) : Sch,Pt -> GrphSpl

SpliceDiagramVertex

SpliceDiagramVertex(s,i) : GrphSpl,RngIntElt -> GrphSplVert

Split

   DeleteSplitCollector(SQP) : SQProc, RngIntElt ->
   DeleteNonsplitCollector(SQP) : SQProc, RngIntElt ->
   DeleteCollector(SQP) : SQProc, RngIntElt ->
   DeleteCollector(SQP, p) : SQProc, RngIntElt ->
   DeleteSplitSolutionspace(SQP, p, i, k): SQProc, RngIntElt, RngIntElt, RngIntElt ->
   IntegralSplit(a, O) : FldFunElt, RngFunOrd -> RngFunOrdElt, RngElt
   IntegralSplit(f, X) : FldFunGElt, Sch -> MPolElt, MPolElt
   IntegralSplit(I) : RngFunOrdIdl -> RngFunOrdIdl, RngElt
   IsSplit(P) : RngFunOrdIdl -> BoolElt
   IsSplit(P, O) : RngFunOrdIdl, RngFunOrd -> BoolElt
   IsSplit(P) : RngOrdIdl -> BoolElt
   IsSplit(P, O) : RngOrdIdl, RngOrd -> BoolElt
   IsTotallySplit(P) : RngFunOrdIdl -> BoolElt
   IsTotallySplit(P, O) : RngFunOrdIdl, RngFunOrd -> BoolElt
   IsTotallySplit(P) : RngOrdIdl -> BoolElt
   IsTotallySplit(P, O) : RngOrdIdl, RngOrd -> BoolElt
   KeepSplit(SQG, SQH) : SQProc, SQProc -> SeqEnum
   KeepSplitAbelian(SQG, SQH) : SQProc, SQProc -> SeqEnum
   KeepSplitElementaryAbelian(SQG, SQH) : SQProc, SQProc -> SeqEnum
   LiftSplitExtension(SQP, p, i, k : parameters) : SQProc, RngIntElt, RngIntElt, RngIntElt -> RngIntElt, SQProc
   LiftSplitExtensionRow(SQP): SQProc -> RngIntElt, SQProc
   NonsplitCollector(SQP, p) : SQProc, RngIntElt ->
   Split(S, D) : MonStgElt, MonStgElt -> [ MonStgElt ]
   SplitAbelianSection(SQP: parameter) : SQProc -> BoolElt, SQProc
   SplitElementaryAbelianSection(SQP: parameter) : SQProc -> BoolElt, SQProc
   SplitExtension(G, M, F) : GrpFin, ModRng, GrpFinFP -> GrpFinFP
   SplitExtension(G, M, F) : GrpPerm, ModRng, GrpFP -> GrpFP
   SplitExtension(CM) : ModCoho -> Grp
   SplitExtensionSpace(SQP): SQProc -> SeqEnum
   SplitSection(SQP: parameter) : SQProc -> BoolElt, SQProc
   FldAC_Split (Example H55E6)
   IO_Split (Example H3E2)

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