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Subindex: Properties .. Pseudo
GrpFPCox_Properties (Example H86E6)
GrpPermCox_Properties (Example H87E9)
GrpRfl_Properties (Example H88E17)
ModFrm_Properties (Example H111E11)
ModSS_Properties (Example H110E4)
RootDtm_Properties (Example H85E12)
RootSys_Properties (Example H84E9)
Abstract Properties of a Group (PERMUTATION GROUPS)
Basic Group Properties (FINITE p-GROUPS)
Basic Group Properties (FINITE SOLUBLE GROUPS)
Determinant and Other Properties (MATRICES)
Elementary Properties of a Subgroup (PERMUTATION GROUPS)
Elementary Properties of Subgroups (MATRIX GROUPS OVER GENERAL RINGS)
Geometrical Properties (SCHEMES)
Global Properties (MATRIX GROUPS OVER GENERAL RINGS)
Minimal and Characteristic Polynomials and Eigenvalues (MATRICES)
Properties (MODULAR FORMS)
Properties (PARTITIONS, WORDS AND YOUNG TABLEAUX)
Properties (SUPERSINGULAR DIVISORS ON MODULAR CURVES)
Properties of a Polycyclic Presentation (POLYCYCLIC GROUPS)
Properties of a Rewrite Group (GROUPS DEFINED BY REWRITE SYSTEMS)
Properties of AG--Codes (ALGEBRAIC-GEOMETRIC CODES)
Properties of an Algebra Module (MODULES OVER AN ALGEBRA)
Properties of an Automatic Group (AUTOMATIC GROUPS)
Properties of Class Fields (ALGEBRAIC FUNCTION FIELDS)
Properties of Elements (FINITE SOLUBLE GROUPS)
Properties of Finite Groups Of Lie Type (MATRIX GROUPS OVER FINITE FIELDS)
Properties of Groups of Lie Type (GROUPS OF LIE TYPE)
Properties of Incidence Geometries and Coset Geometries (INCIDENCE GEOMETRY)
Properties of Invariant Rings (INVARIANT RINGS OF FINITE GROUPS)
Properties of Lattices (LATTICES)
Properties of Module Elements (MODULES OVER AN ALGEBRA)
Properties of Reflection Groups (REFLECTION GROUPS)
Properties of Root Data (ROOT DATA)
Properties of Root Systems (ROOT SYSTEMS)
Properties of Subgroups (FINITE SOLUBLE GROUPS)
Properties of Vectors (FREE MODULES)
Socket Properties (INPUT AND OUTPUT)
Properties of Finite Groups Of Lie Type (MATRIX GROUPS OVER FINITE FIELDS)
Properties of Root Data (ROOT DATA)
Properties of Root Systems (ROOT SYSTEMS)
Elementary Properties of a Subgroup (PERMUTATION GROUPS)
HasIntersectionProperty(C) : CosetGeom -> BoolElt
HasIntersectionPropertyN(C) : CosetGeom -> BoolElt, BoolElt
HasWeakIntersectionProperty(C) : CosetGeom -> BoolElt
UniversalPropertyOfCokernel(pi, f) : MapModAbVar, MapModAbVar -> MapModAbVar
Properties (ALGEBRAICALLY CLOSED FIELDS)
Properties of Lie Algebras and Ideals (LIE ALGEBRAS)
IsProportional(X, k) : Mtrx, RngIntElt -> BoolElt, Tup
Prune(A) : FldAC ->
Prune(~S) : List ->
Prune(S) : List -> List
Prune(phi) : MapSch -> MapSch
Prune(C) : ModCpx -> ModCpx
Prune(C,n) : ModCpx, RngIngElt -> ModCpx
Prune(~S) : SeqEnum ->
Prune(~T) : Tup ->
Prune(T) : Tup -> Tup
pSelmerGroup(p, S) : RngIntElt, { RngOrdIdl } -> G, m
pSelmerGroup(A, p, S) : RngUPolRes, RngIntElt, SetEnum[RngOrdIdl] -> GrpAb, Map
pSelmerGroup(p, S) : RngIntElt, { RngOrdIdl } -> G, m
pSelmerGroup(A, p, S) : RngUPolRes, RngIntElt, SetEnum[RngOrdIdl] -> GrpAb, Map
QuarticG4Covariant(q) : RngUPolElt -> RngUPolElt
QuarticHSeminvariant(q) : RngUPolElt -> RngIntElt
QuarticPSeminvariant(q) : RngUPolElt -> RngIntElt
QuarticQSeminvariant(q) : RngUPolElt -> RngIntElt
QuarticRSeminvariant(q) : RngUPolElt -> RngIntElt
QuarticIInvariant(q) : RngUPolElt -> RngIntElt
PSeudoGenerators(M): ModDed -> SeqEnum
PseudoAdd(P1, P2, P3) : SrfKumPt, SrfKumPt, SrfKumPt -> SrfKumPt
PseudoAddMultiple(P1, P2, P3, n) : SrfKumPt, SrfKumPt, SrfKumPt, RngIntElt -> SrfKumPt
PseudoBasis(I) : AlgAssVOrdIdl[RngOrd] -> SeqEnum
PseudoBasis(O) : AlgAssVOrd[RngOrd] -> SeqEnum
PseudoBasis(M) : ModDed -> SeqEnum
PseudoDimension(C) : Code -> RngIntElt
PseudoMatrix(I) : AlgAssVOrdIdl[RngOrd] -> PMat
PseudoMatrix(O) : AlgAssVOrd[RngOrd]> -> PMat
PseudoMatrix(I, m) : [RngOrdFracIdl], MtrxSpcElt -> PMat
PseudoMordellWeilGroup(E) : CrvEll -> BoolElt, GrpAb, Map
PseudoRandom(G) : GrpBB -> GrpBBElt
PseudoRemainder(f, g) : RngUPolElt, RngUPolElt -> RngUPolElt
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