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Subindex: integer .. Integral
Ideals of Z (INTEGER RESIDUE CLASS RINGS)
INTEGER RESIDUE CLASS RINGS
Polynomials over the Integers (MULTIVARIATE POLYNOMIAL RINGS)
Polynomials over the Integers (UNIVARIATE POLYNOMIAL RINGS)
RING OF INTEGERS
Ideals of Z (INTEGER RESIDUE CLASS RINGS)
a1a2...ar
0xa1a2...ar
INTEGER RESIDUE CLASS RINGS
Integers() : -> RngInt
RingOfIntegers(Q) : FldRat -> RngInt
IntegerRing() : -> RngInt
IntegerRing(F) : FldFunRat -> RngPol
IntegerRing(F) : FldPad -> RngPad
IntegerRing(F) : RngFrac -> Rng
IntegerRing(R) : RngSer -> RngSerPow
IntegerRing(E) : RngSerExt -> RngSerExt
Integers(O) : RngOrd -> RngOrd
MaximalOrder(F) : FldAlg -> RngOrd
MaximalOrder(F) : FldNum -> RngOrd
MaximalOrder(F) : FldQuad -> RngQuad
MaximalOrder(Q) : FldRat -> RngInt
ResidueClassRing(m) : RngIntElt -> RngIntRes
ResidueClassRing(Q) : RngIntEltFact -> RngIntRes
DivideOutIntegers(phi) : MapModAbVar -> MapModAbVar, RngIntElt
IntegerRing() : -> RngInt
IntegerRing(F) : FldFunRat -> RngPol
IntegerRing(F) : FldPad -> RngPad
IntegerRing(F) : RngFrac -> Rng
IntegerRing(R) : RngSer -> RngSerPow
IntegerRing(E) : RngSerExt -> RngSerExt
Integers(O) : RngOrd -> RngOrd
MaximalOrder(F) : FldAlg -> RngOrd
MaximalOrder(F) : FldNum -> RngOrd
MaximalOrder(F) : FldQuad -> RngQuad
MaximalOrder(Q) : FldRat -> RngInt
ResidueClassRing(m) : RngIntElt -> RngIntRes
ResidueClassRing(Q) : RngIntEltFact -> RngIntRes
RingOfIntegers(R) : RngPad -> RngPad
RngInt_Integers (Example H18E2)
Creation of Orders with given Discriminant over the Integers (QUATERNION ALGEBRAS)
IntegerSolutionVariables(L) : LP -> SeqEnum
Intseq(n, b) : RngIntElt, RngIntElt -> [RngIntElt]
IntegerToSequence(n, b) : RngIntElt, RngIntElt -> [RngIntElt]
IntegerToString(n) : RngIntElt -> ModStgElt
IntegerToString(n) : RngIntElt -> MonStgElt
IntegerToString(n, b) : RngIntElt, RngIntElt -> ModStgElt
IntegerToString(n, b) : RngIntElt, RngIntElt -> MonStgElt
DawsonIntegral(r) : FldReElt -> FldReElt
ExponentialIntegral(r) : FldReElt -> FldReElt
ExponentialIntegralE1(r) : FldReElt -> FldReElt
HalfIntegralWeightForms(chi, w) : GrpDrchElt, FldRatElt -> ModFrm
HalfIntegralWeightForms(G, w) : GrpPSL2, FldRatElt -> ModFrm
HalfIntegralWeightForms(N, w) : RngIntElt, FldRatElt -> ModFrm
Integral(f, i) : RngMPolElt, RngIntElt -> RngMPolElt
Integral(s) : RngPowLazElt -> RngPowLazElt
Integral(f) : RngSerElt -> RngSerElt
Integral(p) : RngUPolElt -> RngUPolElt
IntegralBasis(F) : FldAlg -> [ FldAlgElt ]
IntegralBasis(F) : FldNum -> [ FldNumElt ]
IntegralBasis(Q) : FldRat -> [ FldRatElt ]
IntegralBasis(M) : ModSym -> Lat
IntegralBasis(L) : RngLocA -> SeqEnum
IntegralBasisLattice(L) : Lat -> Lat, RngIntElt
IntegralClosure(R, F) : Rng, FldFun -> RngFunOrd
IntegralGroup(G) : GrpMat -> GrpMat, AlgMatElt
IntegralHeckeOperator(M, n) : ModSym, RngIntElt -> AlgMatElt
IntegralHomology(A) : ModAbVar -> Lat
IntegralMapping(M) : ModSym -> Map
IntegralMatrix(phi) : MapModAbVar -> ModMatRngElt
IntegralMatrixGroupDatabase() : -> DB
IntegralMatrixOverQ(phi) : MapModAbVar -> ModMatFldElt
IntegralModel(E) : CrvEll -> CrvEll, Map, Map
IntegralModel(C) : CrvHyp -> CrvHyp, MapIsoSch
IntegralMultiple(D) : DivSchElt -> DivSchElt,RngIntElt
IntegralNormEquation(a, N, O) : RngElt, Map, RngOrd -> BoolElt, [RngOrdElt]
IntegralPart(P) : TorPol -> TorPol
IntegralPoints(E) : CrvEll -> [ PtEll ], [ Tup ]
IntegralQuarticPoints(Q) : [ RngIntElt ] -> [ SeqEnum ]
IntegralQuarticPoints(Q, P) : [ RngIntElt ], [ RngIntElt ] -> [ SeqEnum ]
IntegralSplit(a, O) : FldFunElt, RngFunOrd -> RngFunOrdElt, RngElt
IntegralSplit(f, X) : FldFunFracSchElt, Sch -> RngMPolElt, RngMPolElt
IntegralSplit(I) : RngFunOrdIdl -> RngFunOrdIdl, RngElt
IntegralSplit(I) : RngOrdFracIdl -> RngOrdIdl, RngElt
IntegralUEA(L) : AlgLie -> AlgIUE
IntersectionPairingIntegral(A) : ModAbVar -> AlgMatElt
IsDomain(R) : Rng -> BoolElt
IsIntegral(C) : CrvHyp -> BoolElt
IsIntegral(D) : DivSchElt -> BoolElt
IsIntegral(a) : FldAlgElt -> BoolElt
IsIntegral(a) : FldNumElt -> BoolElt, RngIntElt
IsIntegral(q) : FldRatElt -> BoolElt
IsIntegral(c) : FldReElt -> BoolElt
IsIntegral(L) : Lat -> BoolElt
IsIntegral(P) : PtEll -> BoolElt
IsIntegral(I) : RngFunOrdIdl -> BoolElt
IsIntegral(n) : RngIntElt -> BoolElt
IsIntegral(a) : RngLocAElt -> BoolElt, SeqEnum
IsIntegral(I) : RngOrdFracIdl -> BoolElt
IsIntegral(x) : RngPadElt -> BoolElt
IsIntegral(v) : TorLatElt -> BoolElt
IsIntegralModel(E) : CrvEll -> BoolElt
IsIntegralModel(E, P) : CrvEll, RngOrdIdl -> BoolElt
IspIntegral(C, p) : CrvHyp, RngIntElt -> BoolElt
LogIntegral(r) : FldReElt -> FldReElt
ModularSymbolToIntegralHomology(A, x) : ModAbVar, SeqEnum -> ModTupFldElt
QUAToIntegralUEAMap(U) : AlgQUE -> Map
ThetaSeriesIntegral(L, n) : Lat, RngIntElt -> RngSerElt
qIntegralBasis(M) : ModSym -> SeqEnum
GrpData_Integral (Example H66E16)
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Version: V2.19 of
Mon Dec 17 14:40:36 EST 2012