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Subindex: j-key .. jInvariant
j
GrpData_J2 (Example H28E19)
Points on the Jacobian (HYPERELLIPTIC CURVES)
CrvHyp_Jac_Point_Counting (Example H106E15)
AlgAss_jac_rad (Example H69E2)
CrvHyp_Jac_WeilPairing (Example H106E14)
Jacobi(~P, c, b, a, ~r) : Process(pQuot), RngIntElt, RngIntElt, RngIntElt -> RngIntElt ->
JacobiSymbol(n, m) : RngIntElt, RngIntElt -> RngIntElt
JacobiTheta(q, z) : FldReElt, FldReElt -> FldReElt
JacobiTheta(q, z) : FldReElt, RngSerElt[FldRe] -> RngSerElt
JacobiThetaNullK(q, k) : FldReElt, RngIntElt -> FldReElt
The Jacobi theta and Dedekind eta- functions (REAL AND COMPLEX FIELDS)
The Jacobi theta and Dedekind eta- functions (REAL AND COMPLEX FIELDS)
AnalyticJacobian(f) : RngUPolElt -> AnHcJac
FromAnalyticJacobian(z, A) : Mtrx, AnHcJac -> SeqEnum
Jacobian(C) : CrvHyp -> JacHyp
Jacobian(model) : ModelG1 -> CrvEll
Jacobian(C) : RngMPolElt -> CrvEll
JacobianIdeal(f) : RngMPolElt -> RngMPol
JacobianIdeal(C) : Sch -> RngMPol
JacobianIdeal(X) : Sch -> RngMPol
JacobianMatrix(C) : Sch -> ModMatRngElt
JacobianMatrix(X) : Sch -> ModMatRngElt
JacobianMatrix( [ f ] ) : [ RngMPolElt ] -> RngMPol
JacobianOrdersByDeformation(Q, Y) : RngMPolElt, SeqEnum -> SeqEnum
ToAnalyticJacobian(x, y, A) : FldComElt, FldComElt, AnHcJac -> Mtrx
Isomorphisms, Isogenies and Endomorphism Rings of Analytic Jacobians (HYPERELLIPTIC CURVES)
Jacobians (HYPERELLIPTIC CURVES)
Creation of a Jacobian (HYPERELLIPTIC CURVES)
JacobianIdeal(f) : RngMPolElt -> RngMPol
JacobianIdeal(C) : Sch -> RngMPol
JacobianIdeal(X) : Sch -> RngMPol
JacobianMatrix(C) : Sch -> ModMatRngElt
JacobianMatrix(X) : Sch -> ModMatRngElt
JacobianMatrix( [ f ] ) : [ RngMPolElt ] -> RngMPol
EulerFactorsByDeformation(Q, Y) : RngMPolElt, SeqEnum -> SeqEnum
ZetaFunctionsByDeformation(Q, Y) : RngMPolElt, SeqEnum -> SeqEnum
JacobianOrdersByDeformation(Q, Y) : RngMPolElt, SeqEnum -> SeqEnum
Jacobians over Number Fields or Q (HYPERELLIPTIC CURVES)
Jacobians over Number Fields or Q (HYPERELLIPTIC CURVES)
JacobiSymbol(n, m) : RngIntElt, RngIntElt -> RngIntElt
JacobiTheta(q, z) : FldReElt, FldReElt -> FldReElt
JacobiTheta(q, z) : FldReElt, RngSerElt[FldRe] -> RngSerElt
JacobiThetaNullK(q, k) : FldReElt, RngIntElt -> FldReElt
JacobsonRadical(A) : AlgAssV -> AlgAssV
JacobsonRadical(A) : AlgGen -> AlgGen
JacobsonRadical(M) : ModAlg -> ModAlg
JacobsonRadical(M) : ModRng -> ModRng, Map
JacobsonRadical(e) : SubModLatElt -> SubModLatElt
AlgGrp_jacobson (Example H77E4)
JacobsonRadical(A) : AlgAssV -> AlgAssV
JacobsonRadical(A) : AlgGen -> AlgGen
JacobsonRadical(M) : ModAlg -> ModAlg
JacobsonRadical(M) : ModRng -> ModRng, Map
JacobsonRadical(e) : SubModLatElt -> SubModLatElt
JBessel(n, s) : RngIntElt, FldReElt -> FldReElt
JenningsLieAlgebra(G) : Grp -> AlgLie, SeqEnum
JenningsSeries(G) : GrpFin -> [ GrpFin ]
JenningsSeries(G) : GrpMat -> [ GrpMat ]
JenningsSeries(G) : GrpPC -> [GrpPC]
JenningsSeries(G) : GrpPerm -> [ GrpPerm ]
AlgLie_JenningsLie (Example H90E25)
JenningsLieAlgebra(G) : Grp -> AlgLie, SeqEnum
JenningsSeries(G) : GrpFin -> [ GrpFin ]
JenningsSeries(G) : GrpMat -> [ GrpMat ]
JenningsSeries(G) : GrpPC -> [GrpPC]
JenningsSeries(G) : GrpPerm -> [ GrpPerm ]
InverseJeuDeTaquin(~t, i, j) : Tbl, RngIntElt, RngIntElt ->
JeuDeTaquin(~t) : Tbl ->
JeuDeTaquin(~t, i, j) : Tbl, RngIntElt, RngIntElt ->
Rectify(~t) : Tbl ->
JeuDeTaquin(~t) : Tbl ->
JeuDeTaquin(~t, i, j) : Tbl, RngIntElt, RngIntElt ->
jFunction(X) : CrvMod -> FldFunElt
JH(N, d : parameters) : RngIntElt, RngIntElt, RngIntElt -> ModAbVar
JH(N, gens : parameters) : RngIntElt, [RngIntElt] -> ModAbVar
jInvariant(E) : CrvEll -> RngElt
jInvariant(s) : FldComElt -> FldComElt
jInvariant(F) : QuadBinElt -> FldComElt
jInvariant(f) : QuadBinElt -> RngSerElt
jInvariant(q) : RngSerElt -> RngSerElt
jInvariant(L) : SeqEnum -> FldComElt
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