void FSDEMatIsotropicSurfaceT::TakeParameterList(const ParameterListT& list)
{
FSSolidMatT::TakeParameterList(list);
/* FSDEMatQ1P0SurfaceT stuff */
fMu = list.GetParameter("mu");
fElectricPermittivity = list.GetParameter("epsilon");
fNrig = list.GetParameter("Nrig");
fLambda = list.GetParameter("lambda");
/* Isotropic surface stuff */
fNu = list.GetParameter("Poisson");
fE = list.GetParameter("Young_Modulus");
/* dimension work space */
fModulusKStV.Dimension(kStressDim);
fIsotropicStress.Dimension(kNumDOF);
fStress1.Dimension(kNumDOF);
fTM.Dimension(kStressDim);
/* Calculate (constant) Isotropic modulus */
SetModulus();
}
PAlgebraModDerived<type>::PAlgebraModDerived(const PAlgebra& _zMStar, long _r)
: zMStar(_zMStar), r(_r)
{
long p = zMStar.getP();
long m = zMStar.getM();
// For dry-run, use a tiny m value for the PAlgebra tables
if (isDryRun()) m = (p==3)? 4 : 3;
assert(r > 0);
ZZ BigPPowR = power_ZZ(p, r);
assert(BigPPowR.SinglePrecision());
pPowR = to_long(BigPPowR);
long nSlots = zMStar.getNSlots();
RBak bak; bak.save();
SetModulus(p);
// Compute the factors Ft of Phi_m(X) mod p, for all t \in T
RX phimxmod;
conv(phimxmod, zMStar.getPhimX()); // Phi_m(X) mod p
vec_RX localFactors;
EDF(localFactors, phimxmod, zMStar.getOrdP()); // equal-degree factorization
RX* first = &localFactors[0];
RX* last = first + localFactors.length();
RX* smallest = min_element(first, last);
swap(*first, *smallest);
// We make the lexicographically smallest factor have index 0.
// The remaining factors are ordered according to their representives.
RXModulus F1(localFactors[0]);
for (long i=1; i<nSlots; i++) {
unsigned long t =zMStar.ith_rep(i); // Ft is minimal polynomial of x^{1/t} mod F1
unsigned long tInv = InvMod(t, m); // tInv = t^{-1} mod m
RX X2tInv = PowerXMod(tInv,F1); // X2tInv = X^{1/t} mod F1
IrredPolyMod(localFactors[i], X2tInv, F1);
}
/* Debugging sanity-check #1: we should have Ft= GCD(F1(X^t),Phi_m(X))
for (i=1; i<nSlots; i++) {
unsigned long t = T[i];
RX X2t = PowerXMod(t,phimxmod); // X2t = X^t mod Phi_m(X)
RX Ft = GCD(CompMod(F1,X2t,phimxmod),phimxmod);
if (Ft != localFactors[i]) {
cout << "Ft != F1(X^t) mod Phi_m(X), t=" << t << endl;
exit(0);
}
}*******************************************************************/
if (r == 1) {
build(PhimXMod, phimxmod);
factors = localFactors;
pPowRContext.save();
// Compute the CRT coefficients for the Ft's
crtCoeffs.SetLength(nSlots);
for (long i=0; i<nSlots; i++) {
RX te = phimxmod / factors[i]; // \prod_{j\ne i} Fj
te %= factors[i]; // \prod_{j\ne i} Fj mod Fi
InvMod(crtCoeffs[i], te, factors[i]); // \prod_{j\ne i} Fj^{-1} mod Fi
}
}
else {
PAlgebraLift(zMStar.getPhimX(), localFactors, factors, crtCoeffs, r);
RX phimxmod1;
conv(phimxmod1, zMStar.getPhimX());
build(PhimXMod, phimxmod1);
pPowRContext.save();
}
// set factorsOverZZ
factorsOverZZ.resize(nSlots);
for (long i = 0; i < nSlots; i++)
conv(factorsOverZZ[i], factors[i]);
genCrtTable();
genMaskTable();
}
