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Subindex: CongruenceSubgroup .. Conjugate
CongruenceSubgroup(N) : RngIntElt -> GrpPSL2
CongruenceSubgroup(i,N) : RngIntElt, RngIntElt -> GrpPSL2
CongruenceSubgroup([N,M,P]) : SeqEnum -> GrpPSL2
CongruenceSubgroup(N,char) : SeqEnum, GrpDrchElt -> GrpPSL2
Conic(C) : Crv -> MapSch
Conic(P, S) : Plane, { PlanePt } -> SetEnum
Conic(X,f) : Prj, RngMPolElt -> CrvCon
Conic(P,S) : Prj, {Pt} -> Crv
IsConic(C) : Sch -> BoolElt, CrvCon
IsConic(X) : Sch -> BoolElt,CrvCon
RATIONAL CURVES AND CONICS
CrvCon_ConicAccess (Example H101E4)
CrvCon_ConicAutomorphisms (Example H101E13)
CrvCon_ConicCreation (Example H101E1)
CrvCon_ConicCurve (Example H101E3)
CrvCon_ConicMinimalModel (Example H101E5)
SylowConjClassical(G,P,S,type,p) : GrpMat, GrpMat, GrpMat, MonStgElt, RngIntElt -> GrpMatElt
ConjecturalRegulator(E) : CrvEll -> FldReElt, RngIntElt
ConjecturalRegulator(E, v) : CrvEll, FldReElt -> FldReElt
CrvEll_conjectural-regulator (Example H102E40)
ConjecturalRegulator(E) : CrvEll -> FldReElt, RngIntElt
ConjecturalRegulator(E, v) : CrvEll, FldReElt -> FldReElt
Classes(G) : GrpAb -> [ <RngIntElt, RngIntElt, GrpAbElt> ]
ConjugacyClasses(G) : GrpAb -> [ <RngIntElt, RngIntElt, GrpAbElt> ]
ConjugacyClasses(W) : GrpFPCox -> [GrpFPCoxElt]
ConjugacyClasses(G) : GrpPC -> [ <RngIntElt, RngIntElt, GrpPCElt> ]
ConjugacyClasses(W) : GrpPermCox -> [GrpPermElt]
ConjugacyClasses(G: parameters) : GrpFin -> [ <RngIntElt, RngIntElt, GrpFinElt> ]
ConjugacyClasses(G: parameters) : GrpMat -> [ < RngIntElt, RngIntElt, GrpMatElt > ]
ConjugacyClasses(G: parameters) : GrpPerm -> [ <RngIntElt, RngIntElt, GrpPermElt> ]
ReeSylowConjugacy(G, R, S, p) : GrpMat, GrpMat, GrpMat, RngIntElt -> GrpMatElt, GrpSLPElt
SuzukiSylowConjugacy(G, R, S, p) : GrpMat, GrpMat, GrpMat, RngIntElt -> GrpMatElt, GrpSLPElt
GrpGPC_Conjugacy (Example H32E12)
Computing the Class Invariants (BRAID GROUPS)
Conjugacy (FINITE SOLUBLE GROUPS)
Conjugacy of Subgroups of the Classical Groups (MATRIX GROUPS OVER FINITE FIELDS)
Conjugacy Testing and Conjugacy Search (BRAID GROUPS)
Conjugacy Testing and Conjugacy Search (BRAID GROUPS)
Definition of the Class Invariants (BRAID GROUPS)
Groups (OVERVIEW)
Conjugacy of Subgroups of the Classical Groups (MATRIX GROUPS OVER FINITE FIELDS)
Classes(G) : GrpAb -> [ <RngIntElt, RngIntElt, GrpAbElt> ]
ConjugacyClasses(G) : GrpAb -> [ <RngIntElt, RngIntElt, GrpAbElt> ]
ConjugacyClasses(W) : GrpFPCox -> [GrpFPCoxElt]
ConjugacyClasses(G) : GrpPC -> [ <RngIntElt, RngIntElt, GrpPCElt> ]
ConjugacyClasses(W) : GrpPermCox -> [GrpPermElt]
ConjugacyClasses(G: parameters) : GrpFin -> [ <RngIntElt, RngIntElt, GrpFinElt> ]
ConjugacyClasses(G: parameters) : GrpMat -> [ < RngIntElt, RngIntElt, GrpMatElt > ]
ConjugacyClasses(G: parameters) : GrpPerm -> [ <RngIntElt, RngIntElt, GrpPermElt> ]
ComplexConjugate(a) : FldCycElt -> FldCycElt
ComplexConjugate(a) : FldQuadElt -> FldQuadElt
ComplexConjugate(q) : FldRatElt -> FldRatElt
ComplexConjugate(r) : FldReElt -> FldReElt
ComplexConjugate(n) : RngIntElt -> RngIntElt
Conjugate(x) : AlgQuatElt -> AlgQuatElt
Conjugate(I) : AlgQuatOrdIdl -> AlgQuatOrdIdl
Conjugate(a, k) : FldAlgElt, RngIntElt -> FldPrElt
Conjugate(a, l) : FldAlgElt, [RngIntElt] -> FldReElt
Conjugate(a, r) : FldCycElt, FldCycElt -> FldCycElt
Conjugate(a, n) : FldCycElt, RngIntElt -> FldCycElt
Conjugate(a) : FldQuadElt -> FldQuadElt
Conjugate(q) : FldRatElt -> FldRatElt
Conjugate(n) : RngIntElt -> RngIntElt
Conjugate(I) : RngQuadFracIdl -> RngQuadFracIdl
Conjugate(t) : Tbl -> Tbl
ConjugatePartition(P) : SeqEnum -> SeqEnum
ExcludedConjugate(P) : GrpFPCosetEnumProc -> GrpFPElt
ExistsExcludedConjugate(P) : GrpFPCosetEnumProc -> BoolElt, GrpFPElt
GaloisConjugate(x, j) : AlgChtrElt, RngIntElt -> AlgChtrElt
HasComplexConjugate(K) : FldAlg -> BoolElt, Map
IsConjugate(G, H, K) : GrpAb, GrpAb, GrpAb -> BoolElt, GrpAbElt
IsConjugate(G, H, K) : GrpAb, GrpAb, GrpAb -> BoolElt, GrpAbElt
IsConjugate(G, g, h) : GrpAb, GrpAbElt, GrpAbElt -> BoolElt, GrpAbElt
IsConjugate(G, H, K) : GrpFin, GrpFin, GrpFin -> BoolElt, GrpFinElt
IsConjugate(G, H, K) : GrpFin, GrpFin, GrpFin -> BoolElt, GrpFinElt
IsConjugate(G, g, h) : GrpFin, GrpFinElt, GrpFinElt -> BoolElt, GrpFinElt
IsConjugate(G, g, h) : GrpFin, GrpFinElt, GrpFinElt -> BoolElt, GrpFinElt
IsConjugate(G, H, K) : GrpFP, GrpFP, GrpFP -> BoolElt, GrpFPElt
IsConjugate(G, H, K) : GrpGPC, GrpGPC, GrpGPC -> BoolElt, GrpGPCElt
IsConjugate(G, H, K) : GrpGPC, GrpGPC, GrpGPC -> BoolElt, GrpGPCElt
IsConjugate(G, g, h) : GrpGPC, GrpGPCElt, GrpGPCElt -> BoolElt, GrpGPCElt
IsConjugate(G, H, K) : GrpMat, GrpMat, GrpMat -> BoolElt, GrpMatElt | Unass
IsConjugate(G, g, h) : GrpMat, GrpMatElt, GrpMatElt -> BoolElt, GrpMatElt | Unass
IsConjugate(G, H, K) : GrpPC, GrpPC, GrpPC -> BoolElt, GrpPCElt
IsConjugate(G, g, h) : GrpPC, GrpPCElt, GrpPCElt -> BoolElt, GrpPCElt
IsConjugate(G, g, h) : GrpPC, GrpPCElt, GrpPCElt -> BoolElt, GrpPCElt
IsConjugate(G, H, K) : GrpPerm, GrpPerm, GrpPerm -> BoolElt, GrpPermElt
IsConjugate(G, Y, y, z) : GrpPerm, GSet, Elt, Elt -> BoolElt, GrpPermElt
IsConjugate(u, v: parameters) : GrpBrdElt, GrpBrdElt -> BoolElt, GrpBrdElt
IsConjugate(G, g, h: parameters) : GrpPerm, GrpPermElt, GrpPermElt -> BoolElt, GrpPermElt
LeftConjugate(u, v) : GrpBrdElt, GrpBrdElt -> GrpBrdElt
LeftConjugate(~u, v) : GrpBrdElt, GrpBrdElt -> GrpBrdElt
H ^ g : GrpAb, GrpAbElt -> GrpAb
H ^ g : GrpFin, GrpFinElt -> GrpFin
H ^ u : GrpFP, GrpFPElt -> GrpFP
H ^ g : GrpGPC, GrpGPCElt -> GrpGPC
H ^ g : GrpMat, GrpMatElt -> GrpMat
H ^ g : GrpPC, GrpPCElt -> GrpPC
H ^ g : GrpPerm, GrpPermElt -> GrpPerm
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