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Subindex: homomorphism-element  ..    Hypercentre




homomorphism-element

   Elements of M_n as Homomorphisms (MATRIX ALGEBRAS)


homomorphism_access

   Accessing Homomorphisms (BRAID GROUPS)

   Accessing Homomorphisms (FINITELY PRESENTED GROUPS)


homomorphism_constr

   Constructing Homomorphisms (BRAID GROUPS)

   Construction of Homomorphisms (AUTOMATIC GROUPS)

   Construction of Homomorphisms (FINITELY PRESENTED GROUPS)

   Construction of Homomorphisms (GROUPS DEFINED BY REWRITE SYSTEMS)

   Construction of Homomorphisms (MONOIDS GIVEN BY REWRITE SYSTEMS)

   Construction of Homomorphisms (POLYCYCLIC GROUPS)


homomorphism_general

   General remarks (AUTOMATIC GROUPS)

   General remarks (BRAID GROUPS)

   General remarks (FINITELY PRESENTED GROUPS)

   General remarks (GROUPS DEFINED BY REWRITE SYSTEMS)

   General remarks (MONOIDS GIVEN BY REWRITE SYSTEMS)

   General remarks (POLYCYCLIC GROUPS)


homomorphism_onto_simple

   Finding Homomorphisms onto Simple Groups (FINITELY PRESENTED GROUPS)


homomorphism_perm

   Computing Homomorphisms to Permutation Groups (FINITELY PRESENTED GROUPS)


homomorphism_perm_process

   Computing Homomorphisms to Permutation Groups Interactively (FINITELY PRESENTED GROUPS)


homomorphism_representations

   Representations of Braid Groups (BRAID GROUPS)


Homomorphisms

   Homomorphisms(G, H) : GrpAb, GrpAb -> GrpAb, Map

   Homomorphisms(P) : GrpFPHomsProc -> [ HomGrp ]

   Homomorphisms(G, H) : GrpPC, GrpPC -> SeqEnum

   Homomorphisms(F, G, A : parameters) : GrpFP, GrpPerm, GrpPerm -> [ HomGrp ]

   HomomorphismsProcess(F, G, A : parameters) : GrpFP, GrpPerm, GrpPerm -> GrpFPHomsProc

   AlgBas_Homomorphisms (Example H76E3)

   FldRe_Homomorphisms (Example H40E2)

   GrpAbGen_Homomorphisms (Example H21E8)

   GrpBrd_Homomorphisms (Example H29E9)

   Grp_Homomorphisms (Example H16E1)

   RngOrd_Homomorphisms (Example H50E8)


homomorphisms

   Creating Homomorphisms (GROUPS OF STRAIGHT-LINE PROGRAMS)

   Homomorphisms (BASIC ALGEBRAS)

   Homomorphisms (FINITE SOLUBLE GROUPS)

   Homomorphisms (FREE MODULES)

   Homomorphisms (GENERIC ABELIAN GROUPS)

   Homomorphisms between Modules (MODULES OVER DEDEKIND DOMAINS)


Homomorphisms1

   GrpFP_1_Homomorphisms1 (Example H26E18)


Homomorphisms2

   GrpFP_1_Homomorphisms2 (Example H26E19)


HomomorphismSpeed

   GrpSLP_HomomorphismSpeed (Example H32E3)


HomomorphismsProcess

   HomomorphismsProcess(F, G, A : parameters) : GrpFP, GrpPerm, GrpPerm -> GrpFPHomsProc


Hook

   HookLength(t, i, j) : Tbl, RngIntElt, RngIntElt -> RngIntElt

   RandomHookWalk(P, i, j) : SeqEnum[RngIntElt], RngIntElt, RngIntElt ->                                                         RngIntElt, RngIntElt


HookLength

   HookLength(t, i, j) : Tbl, RngIntElt, RngIntElt -> RngIntElt


Horizontal

   HorizontalJoin(X, Y) : ModMatRngElt, ModMatRngElt -> ModMatRngElt

   HorizontalJoin(X, Y) : Mtrx, Mtrx -> Mtrx

   HorizontalJoin(Q) : [ ModMatRngElt ] -> ModMatRngElt

   HorizontalJoin(Q) : [ Mtrx ] -> Mtrx


HorizontalJoin

   HorizontalJoin(X, Y) : ModMatRngElt, ModMatRngElt -> ModMatRngElt

   HorizontalJoin(X, Y) : Mtrx, Mtrx -> Mtrx

   HorizontalJoin(Q) : [ ModMatRngElt ] -> ModMatRngElt

   HorizontalJoin(Q) : [ Mtrx ] -> Mtrx


Hull

   InjectiveHull(M) : ModAlg -> ModAlg, ModMatFldElt,             SeqEnum[ModMatFldElt], SeqEnum[ModMatFldElt], SeqEnum[RngIntElt]


hyp

   Heights and Mordell--Weil Group (HYPERELLIPTIC CURVES)


hypcurve

   Creation of a Hyperelliptic Curve (HYPERELLIPTIC CURVES)

   Creation Predicates (HYPERELLIPTIC CURVES)


Hyperbolic

   HyperbolicCoxeterGraph( i ) : RngIntElt -> GrphUnd

   HyperbolicCoxeterMatrix( i ) : RngIntElt -> AlgMatElt

   IsCompactHyperbolic( W ) : GrpFPCox -> BoolElt

   IsCoxeterCompactHyperbolic( M ) : AlgMatElt -> BoolElt

   IsCoxeterCompactHyperbolic( G ) : GrphUnd -> BoolElt

   IsCoxeterHyperbolic( M ) : AlgMatElt -> BoolElt

   IsCoxeterHyperbolic( G ) : GrphUnd -> BoolElt

   IsHyperbolic( W ) : GrpFPCox -> BoolElt

   Cartan_Hyperbolic (Example H82E19)


hyperbolic

   Hyperbolic Functions (REAL AND COMPLEX FIELDS)

   Hyperbolic Functions and their Inverses (POWER, LAURENT AND PUISEUX SERIES)

   Inverse Hyperbolic Functions (REAL AND COMPLEX FIELDS)


HyperbolicCoxeterGraph

   HyperbolicCoxeterGraph( i ) : RngIntElt -> GrphUnd


HyperbolicCoxeterMatrix

   HyperbolicCoxeterMatrix( i ) : RngIntElt -> AlgMatElt


Hypercenter

   Hypercenter(G) : GrpAb -> GrpAb

   Hypercentre(G) : GrpAb -> GrpAb

   Hypercentre(G) : GrpFin -> GrpFin

   Hypercentre(G) : GrpPC -> GrpPC

   Hypercentre(G) : GrpPerm -> GrpPerm


Hypercentre

   Hypercenter(G) : GrpAb -> GrpAb

   Hypercentre(G) : GrpAb -> GrpAb

   Hypercentre(G) : GrpFin -> GrpFin

   Hypercentre(G) : GrpPC -> GrpPC

   Hypercentre(G) : GrpPerm -> GrpPerm




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