[____] [____] [_____] [____] [__] [Index] [Root]
Subindex: abs .. Absolutely
Absolute Value and Sign (RATIONAL FIELD)
Absolute Value and Sign (RATIONAL FIELD)
AbsoluteQuotientRing(A) : FldAC -> RngUPolRes
AbsoluteAffineAlgebra(A) : FldAC -> RngUPolRes
AbsoluteAlgebra(A) : RngUPolRes -> SetCart, Map
AbsoluteBasis(K) : FldAlg -> [FldAlgElt]
AbsoluteCharacteristicPolynomial(a) : FldAlgElt -> RngUPolElt
AbsoluteDegree(A) : FldAb -> RngIntElt
AbsoluteDegree(F) : FldFun -> RngIntElt
AbsoluteDegree(O) : RngOrd -> RngIntElt
AbsoluteDiscriminant(A) : FldAb -> RngIntElt
AbsoluteDiscriminant(K) : FldAlg -> FldRatElt
AbsoluteDiscriminant(O) : RngFunOrd -> .
AbsoluteDiscriminant(O) : RngOrd -> RngIntElt
AbsoluteField(F) : FldAlg -> FldAlg
AbsoluteGaloisGroup(A) : FldAb -> GrpPerm, SeqEnum, GaloisData
AbsoluteInvariants(C) : CrvHyp -> SeqEnum
AbsoluteLogarithmicHeight(a) : FldAlgElt -> FldPrElt
AbsoluteMinimalPolynomial(a) : FldAlgElt -> RngUPolElt
AbsoluteModuleOverMinimalField(M, F) : ModGrp, FldFin -> ModGrp
AbsoluteModulesOverMinimalField(Q, F) : [ ModGrp ], FldFin -> [ ModGrp ]
AbsoluteNorm(a) : FldAlgElt -> FldRatElt
AbsoluteNorm(a) : FldFinElt -> FldFinElt
AbsoluteNorm(I) : RngOrdIdl -> RngIntElt
AbsoluteOrder(O) : RngFunOrd -> RngFunOrd
AbsoluteOrder(O) : RngOrd -> RngOrd
AbsolutePolynomial(A) : FldAC ->
AbsolutePrecision(x) : RngPadElt -> RngIntElt
AbsolutePrecision(f) : RngSerElt -> RngIntElt
AbsolutePrecision(e) : RngSerExtElt -> RngIntElt
AbsoluteRationalScroll(k,N) : Rng,SeqEnum -> PrjScrl
AbsoluteRepresentation(G) : GrpMat -> GrpMat, Map
AbsoluteRepresentationMatrix(a) : FldAlgElt -> AlgMatElt
AbsoluteTotallyRamifiedExtension(R) : RngPad -> RngPad, Map
AbsoluteTrace(a) : FldAlgElt -> FldRatElt
AbsoluteTrace(a) : FldFinElt -> FldFinElt
AbsoluteValue(q) : FldRatElt -> FldRatElt
AbsoluteValue(r) : FldReElt-> FldReElt
AbsoluteValue(n) : RngIntElt -> RngIntElt
AbsoluteValue(f) : RngMPolElt -> RngMPolElt
AbsoluteValue(p) : RngUPolElt -> RngUPolElt
AbsoluteValues(a) : FldAlgElt -> [FldPrElt]
Basis(Q) : FldRat -> [FldRatElt]
Degree(Q) : FldRat -> RngIntElt
Discriminant(Q) : FldRat -> RngIntElt
IsAbsoluteField(K) : FldAlg -> BoolElt
IsAbsoluteOrder(O) : RngFunOrd -> BoolElt
IsAbsoluteOrder(O) : RngOrd -> BoolElt
Rank(R) : RootStr -> RngIntElt
Absolute Field (ALGEBRAICALLY CLOSED FIELDS)
AbsoluteQuotientRing(A) : FldAC -> RngUPolRes
AbsoluteAffineAlgebra(A) : FldAC -> RngUPolRes
AbsoluteAlgebra(A) : RngUPolRes -> SetCart, Map
AbsoluteBasis(K) : FldAlg -> [FldAlgElt]
Basis(Q) : FldRat -> [FldRatElt]
AbsoluteCharacteristicPolynomial(a) : FldAlgElt -> RngUPolElt
AbsoluteDegree(A) : FldAb -> RngIntElt
AbsoluteDegree(F) : FldFun -> RngIntElt
AbsoluteDegree(O) : RngOrd -> RngIntElt
Degree(Q) : FldRat -> RngIntElt
AbsoluteDiscriminant(A) : FldAb -> RngIntElt
AbsoluteDiscriminant(K) : FldAlg -> FldRatElt
AbsoluteDiscriminant(O) : RngFunOrd -> .
AbsoluteDiscriminant(O) : RngOrd -> RngIntElt
Discriminant(Q) : FldRat -> RngIntElt
AbsoluteField(F) : FldAlg -> FldAlg
AbsoluteGaloisGroup(A) : FldAb -> GrpPerm, SeqEnum, GaloisData
AbsoluteInvariants(C) : CrvHyp -> SeqEnum
AbsoluteLogarithmicHeight(a) : FldAlgElt -> FldPrElt
AbsolutelyIrreducibleConstituents(M) : ModGrp -> [ ModGrp ]
AbsolutelyIrreducibleModule(M) : ModRng -> ModRng
AbsolutelyIrreducibleModulesBurnside(G, K : parameters ) : Grp, FldFin -> [ ModGrp ]
AbsolutelyIrreducibleModulesSchur(G, K: parameters) : GrpPC, Rng -> List[GModule]
AbsolutelyIrreducibleRepresentationProcessDelete(~P) : SolRepProc ->
AbsolutelyIrreducibleRepresentationsInit(G, F : parameters) : GrpPC, Fld -> SolRepProc
AbsolutelyIrreducibleRepresentationsSchur(G, k: parameters) : GrpPC, Rng -> List[Map]
IrreducibleModules(G, K : parameters) : Grp, Fld -> Seqenum
IsAbsolutelyIrreducible(C) : Crv -> BoolElt
IsAbsolutelyIrreducible(G) : GrpMat -> BoolElt
IsAbsolutelyIrreducible(M) : ModRng -> BoolElt, AlgMatElt, RngIntElt
[____] [____] [_____] [____] [__] [Index] [Root]