[____] [____] [_____] [____] [__] [Index] [Root]
Subindex: square .. Standard
Sequences (OVERVIEW)
Square Root (POWER, LAURENT AND PUISEUX SERIES)
Sequences (OVERVIEW)
Sqrt(f) : RngSerElt -> RngSerElt
Square Root (POWER, LAURENT AND PUISEUX SERIES)
IsogenyMapPsiSquared(I) : Map -> RngUPolElt
IsSquarefree(n) : RngIntElt -> BoolElt
SquarefreeFactorization(n) : RngIntElt -> RngIntElt, RngIntElt
SquarefreeFactorization(f) : RngMPolElt -> [ <RngMPolElt, RngIntElt> ]
SquarefreeFactorization(f) : RngUPolElt -> [ <RngUPolElt, RngIntElt> ]
SquarefreePart(f) : RngMPolElt -> RngMPolElt
SquarefreePartialFractionDecomposition(f) : FldFunRatUElt -> [ <RngUPolElt, RngIntElt, RngUPolElt> ]
SquareFreeFactorization(f) : RngUPolElt -> [ < RngUPolElt, RngIntElt > ]
Squarefree(n) : RngIntElt -> RngIntElt, RngIntElt
SquarefreeFactorization(n) : RngIntElt -> RngIntElt, RngIntElt
SquarefreeFactorization(f) : RngMPolElt -> [ <RngMPolElt, RngIntElt> ]
SquarefreeFactorization(f) : RngUPolElt -> [ <RngUPolElt, RngIntElt> ]
SquarefreePart(f) : RngMPolElt -> RngMPolElt
SquarefreePartialFractionDecomposition(f) : FldFunRatUElt -> [ <RngUPolElt, RngIntElt, RngUPolElt> ]
SquareLatticeGraph(n) : RngIntElt -> GrphUnd
SquareRoot(a) : RngIntResElt -> RngIntResElt
Sqrt(a) : RngIntResElt -> RngIntResElt
Sqrt(a) : RngOrdElt -> RngOrdElt
SquareRoot(a) : FldACElt -> FldACElt
SquareRoot(c) : FldComElt -> FldComElt
SquareRoot(a) : FldFinElt -> FldFinElt
SquareRoot(I) : RngFunOrdIdl -> RngFunOrdIdl
SquareRoot(I) : RngOrdFracIdl -> RngOrdFracIdl
SquareRoot(x) : RngPadElt -> RngPadElt
SquareRoot(s) : RngPowLazElt -> RngPowLazElt
SquareRoot(f) : RngSerElt -> RngSerElt
SQUOFOF(n) : RngIntElt -> RngIntEltFact, [ RngIntElt ]
SRegulator(S) : SetEnum[PlcFunElt] -> RngIntElt
GeneralizedSrivastavaCode(A, W, Z, t, S) : [ FldFinElt ], [ FldFinElt ], [ FldFinElt ], RngIntElt, FldFin -> Code
SrivastavaCode(A, W, mu, S) : [ FldFinElt ], [ FldFinElt ], RngIntElt, FldFin -> Code
SrivastavaCode(A, W, mu, S) : [ FldFinElt ], [ FldFinElt ], RngIntElt, FldFin -> Code
Computing Positive Conjugates and Super Summit Sets Interactively (BRAID GROUPS)
Computing Super Summit Sets (BRAID GROUPS)
Positive Conjugates and Super Summit Sets (BRAID GROUPS)
Positive Conjugates, Super Summit Sets and Conjugacy Testing (BRAID GROUPS)
Testing Conjugacy of Elements (BRAID GROUPS)
ApproximateStabiliser(G, A, U: parameters) : GrpMat, GrpMat, ModTupFld -> GrpMat, GrpMat, RngIntElt, RngIntElt, RngIntElt
BasicStabilizer(G, i) : GrpMat, RngIntElt -> GrpMat
BasicStabilizer(G, i) : GrpPerm, RngIntElt -> GrpPerm
BasicStabilizerChain(G) : GrpMat -> [GrpMat]
BasicStabilizerChain(G) : GrpPerm -> [GrpPerm]
StabiliserOfSpaces(Q) : Spaces -> GrpMat, SeqEnum
Stabilizer(G, Y, y) : GrpPerm, GSet, Elt -> GrpPerm
UnipotentStabiliser(G, U: parameters) : Grp, ModTupFld -> GrpMat, ModTupFld, GrpMatElt
StabiliserOfSpaces(Q) : Spaces -> GrpMat, SeqEnum
GrpMat_StabiliserOfSpaces (Example H18E22)
MonomialGroupStabilizer(C, k) : Code, RngIntElt -> GrpPerm, PowMap, Map
AutomorphismGroupStabilizer(C, k) : Code, RngIntElt -> GrpPerm, PowMap, Map
AutomorphismGroupStabilizer(D, k) : Inc, RngIntElt -> GrpPerm, PowMap, Map
BasicStabilizer(G, i) : GrpMat, RngIntElt -> GrpMat
BasicStabilizer(G, i) : GrpPerm, RngIntElt -> GrpPerm
BasicStabilizerChain(G) : GrpMat -> [GrpMat]
BasicStabilizerChain(G) : GrpPerm -> [GrpPerm]
CollineationGroupStabilizer(P, k) : Plane, RngIntElt -> GrpPerm, GSet, GSet, PowMap, Map
Stabilizer(G, y) : GrpMat, Elt -> GrpMat
Stabilizer(A, Y, y) : GrpPerm, Elt -> GrpPerm
Stabilizer(G, Y, y) : GrpPerm, Elt -> GrpPerm
Stabilizer(G, Y, y) : GrpPerm, Elt -> GrpPerm
Stabilizer(G, Y, y) : GrpPerm, GSet, Elt -> GrpPerm
Stabilizer(a,G) : SpcHypElt, GrpPSL2 -> GrpPSL2Elt
Images, Orbits and Stabilizers (PERMUTATION GROUPS)
Orbit and Stabilizer Functions for Large Groups (MATRIX GROUPS)
Orbits and Stabilizers (MATRIX GROUPS)
GrpPerm_Stabilizers (Example H17E19)
Finding dependencies: the Linear algebra stage (RING OF INTEGERS)
The Auxiliary data stage (RING OF INTEGERS)
The Factorization stage (RING OF INTEGERS)
The Sieving stage (RING OF INTEGERS)
Standard Construction for Networks (NETWORKS)
Subgraphs (NETWORKS)
IsStandard(t) : Tbl -> BoolElt
IsStandardAffinePatch(A) : Aff -> BoolElt, RngIntElt
IsStandardParabolicSubgroup( W, H ) : GrpPermCox -> GrpPermCox
NumberOfStandardTableaux(P) : SeqEnum -> RngIntElt
NumberOfStandardTableauxOnWeight(n) : RngIntElt -> RngIntElt
StandardAction( W ) : GrpPermCox -> Map
StandardActionGroup( W ) : GrpPermCox -> GrpPerm, Map
StandardForm(C) : Code -> Code, Map
StandardForm(C) : Code -> Code, Map
StandardGraph(G) : Grph -> Grph
StandardGroup(G) : GrpPerm -> GrpPerm, Map
StandardLattice(n) : RngIntElt -> Lat
StandardParabolicSubgroup( W, s ) : GrpPermCox, {} -> GrpPermCox
StandardPresentation(G): GrpPC -> GrpPC, Map
StandardRepresentation( L ) : AlgLie -> Map
StandardRepresentation( G ) : GrpLie -> Map
StandardRootDatum( X, n ) : MonStgElt, RngIntElt -> RootDtm
StandardRootSystem(X, n) : MonStgElt, RngIntElt -> RootSys
StandardTableaux(P) : SeqEnum[RngIntElt] -> SetEnum
StandardTableauxOfWeight(n) : RngIntElt -> SetEnum
GrpPC_Standard (Example H19E1)
[____] [____] [_____] [____] [__] [Index] [Root]