{
static const cln::cl_I n1(1);
const numeric icont_ = A.integer_content();
+ if (cln::instanceof(icont_.to_cl_N(), cln::cl_I_ring)) {
+ const cln::cl_I icont = cln::the<cln::cl_I>(icont_.to_cl_N());
+ if (icont != 1) {
+ Apr = (A/icont_).expand();
+ return icont;
+ } else {
+ Apr = A;
+ return n1;
+ }
+ }
if (cln::instanceof(icont_.to_cl_N(), cln::cl_RA_ring)) {
Apr = (A/icont_).expand();
// A is a polynomail over rationals, so GCD is defined
// up to arbitrary rational number.
return n1;
}
- GINAC_ASSERT(cln::instanceof(icont_.to_cl_N(), cln::cl_I_ring));
- const cln::cl_I icont = cln::the<cln::cl_I>(icont_.to_cl_N());
- if (icont != 1) {
- Apr = (A/icont_).expand();
- return icont;
- } else {
- Apr = A;
- return n1;
- }
+ GINAC_ASSERT(NULL == "expected polynomial over integers or rationals");
}
ex chinrem_gcd(const ex& A_, const ex& B_, const exvector& vars)
Cp = (Cp*numeric(nlc)).expand().smod(pnum);
exp_vector_t cp_deg = degree_vector(Cp, vars);
if (zerop(cp_deg))
- return numeric(g_lc);
+ return numeric(c);
if (zerop(q)) {
H = Cp;
n = cp_deg;
git://www.ginac.de / ginac.git / blobdiff