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Subindex: orders .. Other
Functions related to Orders and Integrality (ALGEBRAIC FUNCTION FIELDS)
Orders (CLASS FIELD THEORY)
FldFunG_orders (Example H55E23)
FldFunG_orders (Example H55E5)
Orders and Ideals (ALGEBRAIC FUNCTION FIELDS)
Orders and Ideals (ORDERS AND ALGEBRAIC FIELDS)
HasOnlyOrdinarySingularities(C) : CrvPln -> BoolElt, RngIntElt, RngMPol
HasOnlyOrdinarySingularitiesMonteCarlo(C) : CrvPln -> BoolElt, RngIntElt
IsOrdinary(E) : CrvEll -> BoolElt
IsOrdinaryProjective(X) : Sch -> BoolElt
IsOrdinaryProjectiveSpace(X) : Sch -> BoolElt
IsOrdinarySingularity(p) : Sch,Pt -> BoolElt
IsOrdinarySingularity(p) : Sch,Pt -> BoolElt
Parametrization(C) : CrvCon -> MapSch
RandomOrdinaryPlaneCurve(d, S, P) : RngIntElt, SeqEnum, Prj -> CrvPln, RngMPol
Ordinary Plane Curves (ALGEBRAIC CURVES)
Crv_ordinary-curves (Example H98E5)
Ordinary Plane Curves (ALGEBRAIC CURVES)
Quaternionic Orders (ORDERS OF ASSOCIATIVE ALGEBRAS)
OreConditions(R, n, j) : RngPad, RngIntElt, RngIntElt -> BoolElt
OreConditions(R, n, j) : RngPad, RngIntElt, RngIntElt -> BoolElt
Orientated Graphs (MULTIGRAPHS)
OrientatedGraph(G) : GrphMultUnd -> GrphMultDir
OrientatedGraph(G) : GrphUnd -> GrphDir
OrientatedGraph(G) : GrphMultUnd -> GrphMultDir
OrientatedGraph(G) : GrphUnd -> GrphDir
Origin(A) : Aff -> Pt
Origin(A) : Aff -> Pt
OriginalRing(A) : AlgFP -> Rng
OriginalRing(Q) : RngMPolRes -> Rng
OriginalRing(A) : AlgFP -> Rng
OriginalRing(Q) : RngMPolRes -> Rng
Orthogonalization (LATTICES)
OrthogonalSum(L, M) : Lat, Lat -> Lat
DirectSum(L, M) : Lat, Lat -> Lat
GeneralOrthogonalGroup(n, q) : RngIntElt, RngIntElt -> GrpMat
GeneralOrthogonalGroupMinus(n, q) : RngIntElt, RngIntElt -> GrpMat
GeneralOrthogonalGroupPlus(n, q) : RngIntElt, RngIntElt -> GrpMat
IsOrthogonalGroup(G) : GrpMat ->BoolElt
IsSelfOrthogonal(C) : Code -> BoolElt
IsSelfOrthogonal(C) : Code -> BoolElt
IsSelfOrthogonal(C) : Code -> BoolElt
IsSymplecticSelfOrthogonal(C) : CodeAdd -> BoolElt
OrthogonalComplement(M) : ModBrdt -> ModBrdt
OrthogonalComplement(M) : ModSS -> ModSS
OrthogonalComponent(x, p) : AlgChtrElt, [ RngIntElt ] -> AlgChtrElt
OrthogonalComponents(x, n) : AlgChtrElt, RngIntElt -> SetEnum
OrthogonalDecomposition(L) : Lat -> [Lat]
PGO(arguments)
PGOMinus(arguments)
PGOPlus(arguments)
PSO(arguments)
PSOMinus(arguments)
PSOPlus(arguments)
SpecialOrthogonalGroup(n, q) : RngIntElt, RngIntElt -> GrpMat
SpecialOrthogonalGroupMinus(n, q) : RngIntElt, RngIntElt -> GrpMat
SpecialOrthogonalGroupPlus(n, q) : RngIntElt, RngIntElt -> GrpMat
SymmetricRepresentationOrthogonal(pa, pe) : SeqEnum,GrpPermElt -> AlgMatElt
Orthogonal Groups (MATRIX GROUPS OVER FINITE FIELDS)
Orthogonal Polynomials (UNIVARIATE POLYNOMIAL RINGS)
Orthogonal Polynomials (UNIVARIATE POLYNOMIAL RINGS)
OrthogonalComplement(M) : ModBrdt -> ModBrdt
OrthogonalComplement(M) : ModSS -> ModSS
OrthogonalComponent(x, p) : AlgChtrElt, [ RngIntElt ] -> AlgChtrElt
OrthogonalComponents(x, n) : AlgChtrElt, RngIntElt -> SetEnum
OrthogonalDecomposition(L) : Lat -> [Lat]
OrthogonalizeGram(F) : MtrxSpcElt -> MtrxSpcElt, AlgMatElt, RngIntElt
Diagonalization(F) : MtrxSpcElt -> MtrxSpcElt, AlgMatElt, RngIntElt
Orthogonalize(L) : Lat -> Lat, AlgMatElt
Orthogonalize(M) : MtrxSpcElt -> MtrxSpcElt, AlgMatElt, RngIntElt
Lat_Orthogonalize (Example H66E15)
OrthogonalizeGram(F) : MtrxSpcElt -> MtrxSpcElt, AlgMatElt, RngIntElt
Diagonalization(F) : MtrxSpcElt -> MtrxSpcElt, AlgMatElt, RngIntElt
OrthogonalSum(L, M) : Lat, Lat -> Lat
DirectSum(L, M) : Lat, Lat -> Lat
Cholesky(L) : Lat -> AlgMatElt
Orthonormalize(L) : Lat -> AlgMatElt
Orthonormalize(M, K) : MtrxSpcElt, Fld -> AlgMatElt
AlgLie_Other (Example H90E14)
AlgLie_Other (Example H90E18)
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