Subindex: <B><B>complement-line-graph-contraction-switching</B> .. complex</B>

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Subindex: complement-line-graph-contraction-switching .. complex

complement-line-graph-contraction-switching

Constructing Complements, Line Graphs; Contraction, Switching (GRAPHS)

Complementary

   ComplementaryDivisor(D,p) : DivCrvElt,Pt -> DivCrvElt
   ComplementaryDivisor(D) : DivFunElt -> DivFunElt
   ComplementaryErrorFunction(r) : FldReElt -> FldReElt

ComplementaryDivisor

ComplementaryDivisor(D,p) : DivCrvElt,Pt -> DivCrvElt
ComplementaryDivisor(D) : DivFunElt -> DivFunElt

ComplementaryErrorFunction

Erfc(r) : FldReElt -> FldReElt
ComplementaryErrorFunction(r) : FldReElt -> FldReElt

ComplementBasis

ComplementBasis(G) : GrpPC -> [GrpPC]

Complements

   Complements(G, N) : GrpPC, GrpPC -> SeqEnum
   Complements(G, M) : GrpPerm, GrpPerm -> [ GrpPerm ]
   Complements(G, M, N) : GrpPerm, GrpPerm, GrpPerm -> [ GrpPerm ]
   Complements(M, S) : ModGrp, ModGrp -> [ ModGrp ]
   NormalComplements(G, H, N) : GrpPC, GrpPC -> SeqEnum
   NormalComplements(G, N) : GrpPC, GrpPC -> SeqEnum
   GrpPerm_Complements (Example H17E28)

complements

Complements and Supplements (PERMUTATION GROUPS)
Decomposabilty and Complements (MODULES OVER A MATRIX ALGEBRA)

Complete

   Complete(~P) : GrpBrdClassProc ->
   Complete(~P) : GrpFPHomsProc ->
   CompleteDigraph(p) : RngIntElt -> GrphDir
   CompleteGraph(p) : RngIntElt -> GrphUnd
   CompleteKArc(P, k) : Plane, RngIntElt -> SetEnum
   CompleteUnion(G, H) : GrphDir, GrphDir -> GrphDir
   CompleteWeightEnumerator(C): Code -> RngMPolElt
   CompleteWeightEnumerator(C): Code -> RngMPolElt
   CompleteWeightEnumerator(C, u): Code, ModTupFldElt -> RngMPolElt
   HasClosedCosetTable(P) : GrpFPCosetEnumProc -> BoolElt
   IsComplete(V) : GrpFPCos -> BoolElt
   IsComplete(G) : Grph -> BoolElt
   IsComplete(D) : Inc -> BoolElt
   IsComplete(L) : LinSys -> BoolElt
   IsComplete(P, A) : Plane, { PlanePt } -> BoolElt
   IsComplete(S) : SeqEnum -> BoolElt

complete

Construction of a Group Algebra (GROUP ALGEBRAS)
Construction of the Complete Matrix Algebra (MATRIX ALGEBRAS)

complete-magma

Construction of a Group Algebra (GROUP ALGEBRAS)
Construction of the Complete Matrix Algebra (MATRIX ALGEBRAS)

CompleteDigraph

CompleteDigraph(p) : RngIntElt -> GrphDir

CompleteGraph

CompleteGraph(p) : RngIntElt -> GrphUnd

CompleteKArc

CompleteKArc(P, k) : Plane, RngIntElt -> SetEnum

CompleteUnion

CompleteUnion(G, H) : GrphDir, GrphDir -> GrphDir

CompleteWeightEnumerator

   CompleteWeightEnumerator(C): Code -> RngMPolElt
   CompleteWeightEnumerator(C): Code -> RngMPolElt
   CompleteWeightEnumerator(C, u): Code, ModTupFldElt -> RngMPolElt

Completion

   comp<K|P> : FldAlg, RngOrdIdl -> FldLoc, Map
   Completion(K, P) : FldAlg, RngOrdIdl -> FldLoc, Map
   Completion(F, p) : FldFun, RngFunOrdIdl -> RngSerLaur, Map
   Completion(Q, P) : FldRat, RngInt -> FldLoc, Map
   Completion(R, P) : Rng, Rng -> Rng, Map
   Completion(O, P) : RngOrd, RngOrdIdl -> RngLoc, Map

completion

   Completion (INTRODUCTION TO RINGS [BASIC RINGS])
   Completion at Ideals (ALGEBRAIC FUNCTION FIELDS)
   Completions (p-ADIC RINGS AND THEIR EXTENSIONS)
   RngLoc_completion (Example H61E23)

Complex

   Complex(L, d) : List, RngIntElt -> ModCpx
   Complex(f, d) : Map, RngIntElt -> ModCpx
   ComplexConjugate(a) : FldCycElt -> FldCycElt
   ComplexConjugate(s) : FldPrElt -> FldPrElt
   ComplexConjugate(a) : FldQuadElt -> FldQuadElt
   ComplexConjugate(q) : FldRatElt -> FldRatElt
   ComplexConjugate(n) : RngIntElt -> RngIntElt
   ComplexEmbeddings(f) : ModFrmElt -> List
   ComplexField() : Null -> FldPr
   ComplexField(p) : RngIntElt -> FldCom
   ComplexReflectionGroup( X, n ) : MonStgElt, RngIntElt -> AlgMatElt
   ComplexToPolar(c) : FldComElt -> FldReElt, FldReElt
   ComplexValue(x) : SpcHypElt) -> FldPrElt
   Homology(C) : ModCpx -> SeqEnum
   IsZeroComplex(C) : ModCpx -> BoolElt
   PolarToComplex(m, a) : FldReElt, FldReElt -> FldComElt
   ZeroComplex(A, m, n) : AlgBas, RngIntElt, RngIntElt -> ModCpx

complex

   Constructing Finite Complex Reflection Groups (REFLECTION GROUPS)
   REAL AND COMPLEX FIELDS
   Real and Complex Valued Functions (ORDERS AND ALGEBRAIC FIELDS)
   Rings, Fields, and Algebras (OVERVIEW)
   The Associated Complex Torus (MODULAR SYMBOLS)

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