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Subindex: DihedralGroup .. Dimensions
DihedralGroup(C, n) : Cat, RngIntElt -> GrpFin
DihedralGroup(GrpFP, n) : Cat, RngIntElt -> GrpFP
DihedralGroup(GrpGPC, n) : Cat, RngIntElt -> GrpGPC
DihedralGroup(GrpPC, n) : Cat, RngIntElt -> GrpPC
DihedralGroup(GrpPerm, n) : Cat, RngIntElt -> GrpPerm
Dilog(s) : FldPrElt -> FldPrElt
BestDimensionLinearCode(K, n, d) : FldFin, RngIntElt, RngIntElt -> Code
BDLC(K, n, d) : FldFin, RngIntElt, RngIntElt -> Code, BoolElt
BrandtModuleDimension(D,N) : RngIntElt, RngIntElt -> RngIntElt
CohomologicalDimension(G, M, i) : GrpFin, ModRng, RngIntElt -> RngIntElt
CohomologicalDimension(G, M, i) : GrpPerm, ModRng, RngIntElt -> RngIntElt
CohomologicalDimension(G, M, n) : GrpPerm, ModRng, RngIntElt -> RngIntElt
CohomologicalDimension(CM, n) : ModCoho, RngIntElt -> RngIntElt
Dimension(B) : AlgBas -> RngIntElt
Dimension(A) : AlgGen -> RngIntElt
Dimension(L) : AlgLie -> RngIntElt
Dimension(R) : AlgMat -> RngIntElt
Dimension(C) : Code -> RngIntElt
Dimension(D) : DivFunElt -> RngIntElt
Dimension( W ) : GrpPermCox -> RngIntElt
Dimension(J) : JacHyp -> RngIntElt
Dimension(L) : Lat -> RngIntElt
Dimension(L) : LinSys -> RngIntElt
Dimension(M) : ModAlg -> RngIntElt
Dimension(M) : ModBrdt -> RngIntElt
Dimension(CM) : ModCoho -> RngIntElt
Dimension(M) : ModDed -> RngIntElt
Dimension(M) : ModFrm -> RngIntElt
Dimension(M) : ModSS -> RngIntElt
Dimension(V) : ModTupFld -> RngIntElt
Dimension(V) : ModTupFld -> RngIntElt
Dimension(I) : RngMPol -> RngIntElt, [ RngIntElt ]
Dimension(Q) : RngMPolRes -> RngIntElt
Dimension( R ) : RootDtm -> RngIntElt
Dimension(R) : RootSys -> RngIntElt
Dimension(X) : Sch -> RngIntElt
Dimension(e) : SubModLatElt -> RngIntElt
Dimension(G) : SymGenLoc -> RngIntElt
DimensionCuspForms(eps, k) : GrpDrchElt, RngIntElt -> RngIntElt
DimensionCuspFormsGamma0(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionCuspFormsGamma1(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionNewCuspFormsGamma0(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionNewCuspFormsGamma1(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionOfCentreOfEndomorphismRing(G) : GrpMat -> RngIntElt
DimensionOfEndomorphismRing(G) : GrpMat -> RngIntElt
DimensionOfExactConstantField(F) : FldFun -> RngIntElt
DimensionOfHighestWeightModule(D, w) : RootDtm, [ ] -> RngIntElt
DimensionOfHomology(C, n) : ModCpx, RngIntElt -> RngIntElt
HomologicalDimension(M) : ModMPol -> RngInt
HomologicalDimension(M) : ModMPol -> RngInt
LargestDimension(D) : DB -> RngIntElt
LargestDimension(D) : DB -> RngIntElt
LargestDimension(D): DB -> RngIntElt
OverDimension(V) : ModTupFld -> RngIntElt
OverDimension(u) : ModTupFldElt -> RngIntElt
OverDimension(M) : ModTupRng -> RngIntElt
OverDimension(u) : ModTupRngElt -> RngIntElt
PseudoDimension(C) : Code -> RngIntElt
Dimension Formulas (MODULAR SYMBOLS)
Dimension of Ideals (IDEAL THEORY AND GRÖBNER BASES)
Finite Dimensional Affine Algebras (AFFINE ALGEBRAS)
Dimension Formulas (MODULAR SYMBOLS)
IsZeroDimensional(I) : RngMPol -> BoolElt
DimensionCuspForms(eps, k) : GrpDrchElt, RngIntElt -> RngIntElt
DimensionCuspFormsGamma0(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionCuspFormsGamma1(N, k) : RngIntElt, RngIntElt -> RngIntElt
ModSym_DimensionFormulas (Example H94E28)
DimensionNewCuspFormsGamma0(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionNewCuspFormsGamma1(N, k) : RngIntElt, RngIntElt -> RngIntElt
DimensionOfCentreOfEndomorphismRing(G) : GrpMat -> RngIntElt
DimensionOfEndomorphismRing(G) : GrpMat -> RngIntElt
DegreeOfExactConstantField(F) : FldFun -> RngIntElt
DimensionOfExactConstantField(F) : FldFun -> RngIntElt
DimensionOfHighestWeightModule(D, w) : RootDtm, [ ] -> RngIntElt
DimensionOfHomology(C, n) : ModCpx, RngIntElt -> RngIntElt
DimensionsOfHomology(C) : ModCpx -> SeqEnum
DimensionsOfInjectiveModules(B) : AlgBas -> SeqEnum
DimensionsOfProjectiveModules(B) : AlgBas -> SeqEnum
DimensionsOfTerms(C) : ModCpx -> SeqEnum
SimpleCohomologyDimensions(M) : ModAlg -> SeqEnum
SimpleHomologyDimensions(M) : ModAlg -> SeqEnum
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