[____] [____] [_____] [____] [__] [Index] [Root]
Subindex: CompositionReversion .. CongruenceSubgroup
RngSer_CompositionReversion (Example H63E2)
CompositionSeries(A) : AlgGen -> [ AlgGen ], [ AlgGen ], AlgMatElt
CompositionSeries(L) : AlgLie -> [ Alg ], [ AlgGen ], AlgMatElt
CompositionSeries(G) : GrpPC -> [GrpPC]
CompositionSeries(G, i) : GrpPC, RngIntElt -> [GrpPC]
CompositionSeries(M) : ModRng, ModRng -> [ ModRng ], [ ModRng ], AlgMatElt
RngOrd_Compositum (Example H50E9)
ModAlg_CompSeries (Example H71E6)
HasComputableAbelianQuotient(G) : GrpFP -> BoolElt, GrpAb, Map
HasComputableLCS(G) : GrpGPC -> BoolElt
HasInfiniteComputableAbelianQuotient(G) : GrpFP -> BoolElt, GrpAb, Map
Structure Computation (GENERIC ABELIAN GROUPS)
ConcatenatedCode(O, I) : Code, Code -> Code
ConcatenatedCode(O, I) : Code, Code -> Code
CodeFld_ConcatenatedCode (Example H107E32)
Strings (OVERVIEW)
IsConcurrent(P, R) : Plane, { PlaneLn } -> BoolElt, PlanePt
The case expression (OVERVIEW)
The case statement (OVERVIEW)
The if statement (OVERVIEW)
The select expression (OVERVIEW)
ConditionalClassGroup(O) : RngOrd -> GrpAb, Map
Classes of Subgroups Satisfying a Condition (PERMUTATION GROUPS)
Conditional Statements and Expressions (STATEMENTS AND EXPRESSIONS)
The case expression (OVERVIEW)
The case statement (OVERVIEW)
The if statement (OVERVIEW)
The select expression (OVERVIEW)
The Simple Conditional Expression (STATEMENTS AND EXPRESSIONS)
The Simple Conditional Statement (STATEMENTS AND EXPRESSIONS)
The Simple Conditional Expression (STATEMENTS AND EXPRESSIONS)
The Simple Conditional Statement (STATEMENTS AND EXPRESSIONS)
ConditionalClassGroup(O) : RngOrd -> GrpAb, Map
ConditionedGroup(G) : GrpPC -> GrpPC
IsConditioned(G) : GrpPC -> BoolElt
Conditioned Presentations (FINITE SOLUBLE GROUPS)
Conditioned Presentations (FINITE SOLUBLE GROUPS)
ConditionedGroup(G) : GrpPC -> GrpPC
Point conditions (SCHEMES)
Conductor(E) : CrvEll -> RngIntElt
Conductor(m) : DivFunElt -> DivFunElt
Conductor(m, U) : DivFunElt, GrpAb -> DivFunElt
Conductor(A) : FldAb -> RngOrdIdl, [RngIntElt]
Conductor(K) : FldCyc -> RngIntElt, [RngIntElt]
Conductor(K) : FldQuad -> RngIntElt, [RngIntElt]
Conductor(Q) : FldRat -> RngIntElt
Conductor(M) : ModBrdt -> RngIntElt
Conductor(Q) : QuadBin -> RngIntElt
Conductor(O) : RngOrd -> RngOrdIdl
Conductor(O) : RngQuad -> RngIntElt
ConductorRange(D) : DB -> RngIntElt, RngIntElt
LargestConductor(D) : DB -> RngIntElt
ConductorRange(D) : DB -> RngIntElt, RngIntElt
TangentCone(p) : Crv,Pt -> Crv
TangentCone(p) : Sch,Pt -> Sch
IsConfluent(G) : GrpAtc -> BoolElt
IsConfluent(G) : GrpRWS -> BoolElt
IsConfluent(M) : MonRWS -> BoolElt
Congruence Subgroups (SUBGROUPS OF PSL_2(R))
CongruenceGroup(M1, M2, prec) : ModFrm, ModFrm, RngIntElt -> GrpAb
CongruenceGroup(M : parameters) : ModSym -> GrpAb
CongruenceModulus(M : parameters) : ModSym -> RngIntElt
CongruenceSubgroup(N) : RngIntElt -> GrpPSL2
CongruenceSubgroup(i,N) : RngIntElt, RngIntElt -> GrpPSL2
CongruenceSubgroup([N,M,P]) : SeqEnum -> GrpPSL2
CongruenceSubgroup(N,char) : SeqEnum, GrpDrchElt -> GrpPSL2
IsCongruence(G) : GrpPSL2 -> BoolElt
Structure of congruence subgroups (SUBGROUPS OF PSL_2(R))
Congruence Subgroups (SUBGROUPS OF PSL_2(R))
CongruenceGroup(M1, M2, prec) : ModFrm, ModFrm, RngIntElt -> GrpAb
CongruenceGroup(M : parameters) : ModSym -> GrpAb
CongruenceModulus(M : parameters) : ModSym -> RngIntElt
ModFrm_Congruences (Example H97E18)
Congruences (MODULAR FORMS)
CongruenceSubgroup(N) : RngIntElt -> GrpPSL2
CongruenceSubgroup(i,N) : RngIntElt, RngIntElt -> GrpPSL2
CongruenceSubgroup([N,M,P]) : SeqEnum -> GrpPSL2
CongruenceSubgroup(N,char) : SeqEnum, GrpDrchElt -> GrpPSL2
[____] [____] [_____] [____] [__] [Index] [Root]