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Subindex: glex .. GModule
Graded Lexicographical: glex (IDEAL THEORY AND GRÖBNER BASES)
RandomGLnZ(n, k, l) : RngIntElt, RngIntElt, RngIntElt -> AlgMatElt
GlobalUnitGroup(C) : Crv[FldFin] -> GrpAb, Map
GlobalUnitGroup(F) : FldFun -> GrpAb, Map
GlobalUnitGroup(F) : FldFun -> GrpAb, Map
IsGlobal(F) : FldFun -> BoolElt
IsGlobalUnit(a) : FldFunElt -> BoolElt
IsGlobalUnit(a) : FldFunElt -> BoolElt
IsGlobalUnitWithPreimage(a) : FldFunElt -> BoolElt, GrpAbElt
IsGlobalUnitWithPreimage(a) : FldFunElt -> BoolElt, GrpAbElt
SetGlobalTCParameters(: parameters) : ->
UnsetGlobalTCParameters() : ->
RngMPol_Global (Example H43E2)
Functions related to Class Group (ALGEBRAIC FUNCTION FIELDS)
Global Function Field Places (ALGEBRAIC FUNCTION FIELDS)
Global Function Fields (ALGEBRAIC FUNCTION FIELDS)
Global Function Fields (ALGEBRAIC FUNCTION FIELDS)
Global Geometry (ALGEBRAIC CURVES)
Global Geometry of Schemes (SCHEMES)
Global Properties (MATRIX GROUPS OVER GENERAL RINGS)
Local Conditions for Conics (RATIONAL CURVES AND CONICS)
Local--Global Correspondence (RATIONAL CURVES AND CONICS)
Norm Residue Symbol (RATIONAL CURVES AND CONICS)
Special Forms of Curves (ALGEBRAIC CURVES)
Functions related to Class Group (ALGEBRAIC FUNCTION FIELDS)
FldFunG_global-class-ex (Example H55E21)
Global Geometry (ALGEBRAIC CURVES)
FldFunG_global-function-fields (Example H55E19)
Global Properties (MATRIX GROUPS OVER GENERAL RINGS)
Special Forms of Curves (ALGEBRAIC CURVES)
FldFunG_global1 (Example H55E20)
Functions Relative to the Constant Field (ALGEBRAIC FUNCTION FIELDS)
Functions relative to the Exact Constant Field (ALGEBRAIC FUNCTION FIELDS)
GlobalUnitGroup(C) : Crv[FldFin] -> GrpAb, Map
GlobalUnitGroup(F) : FldFun -> GrpAb, Map
GlobalUnitGroup(F) : FldFun -> GrpAb, Map
GrpMatGen_GLSylow (Example H20E4)
GModule(M) : AlgBasGrpP -> ModGrp, ModGrp
GModule(G, A) : Grp, AlgMat -> ModGrp
GModule(G, S) : Grp, AlgMat -> ModGrp
GModule(G, A, B) : Grp, Grp, Grp -> ModGrp, Map
GModule(G, A, B) : Grp, Grp, Grp -> ModGrp, Map
GModule(G, P, d) : Grp, RngMPol, RngIntElt -> ModGrp, Map, @ RngMPolElt @
GModule(G, P, d) : Grp, RngMPol, RngIntElt -> ModGrp, Map, @ RngMPolElt @
GModule(G, I, J) : Grp, RngMPol, RngMPol -> ModGrp, Map, @ RngMPolElt @
GModule(G, I, J) : Grp, RngMPol, RngMPol -> ModGrp, Map, @ RngMPolElt @
GModule(G, Q) : Grp, RngMPolRes -> ModGrp, Map, @ RngMPolElt @
GModule(G, Q) : Grp, RngMPolRes -> ModGrp, Map, @ RngMPolElt @
GModule(G, Q) : Grp, [ GrpMatElt ] -> ModGrp
GModule(G, Q) : Grp, [ MtrxS ] -> ModGrp
GModule(G, S) : GrpFin, AlgMat -> ModGrpFin
GModule(G, A, B) : GrpFin, GrpFin, GrpFin -> ModGrpFin, Map
GModule(G, A, B, p) : GrpFP, GrpFP, GrpFP, RngIntElt -> ModGrp, Map
GModule(G, A, p) : GrpFP, GrpFP, RngIntElt -> ModGrp, Map
GModule(G, A, B, p) : GrpGPC, GrpGPC, GrpGPC, RngIntElt -> ModGrp, Map
GModule(G, A, p) : GrpGPC, GrpGPC, RngIntElt -> ModGrp, Map
GModule(G) : GrpMat -> ModGrp
GModule(G) : GrpMat -> ModGrp
GModule(G) : GrpMat -> ModGrp
GModule(G) : GrpMat -> ModGrp
GModule(G, A) : GrpMat, AlgMat -> ModGrp
GModule(G, A, B) : GrpMat, GrpMat, GrpMat -> ModGrp, Map
GModule(G, Q) : GrpMat, [ AlgMatElt ] -> ModGrp
GModule(G, M) : GrpPC, AlgMat -> ModAlg
GModule(G, A) : GrpPC, GrpPC -> ModAlg, Map
GModule(G, A, B) : GrpPC, GrpPC, GrpPC -> ModAlg, Map
GModule(G, K) : GrpPerm, Rng -> ModGrp
GModule(M) : ModAlgBas -> ModGrp
GModuleAction(M) : ModGrp -> Map(Hom)
GModulePrimes(G, A) : GrpFP, GrpFP -> SetMulti
GModulePrimes(G, A, B) : GrpFP, GrpFP, GrpFP -> SetMulti
GModulePrimes(G, A) : GrpGPC, GrpGPC -> SetMulti
GModulePrimes(G, A, B) : GrpGPC, GrpGPC, GrpGPC -> SetMulti
GrpMatGen_GModule (Example H20E28)
GrpPerm_GModule (Example H19E38)
RngInvar_GModule (Example H81E2)
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