// performs the actual series summation for multiple polylogarithms
cln::cl_N multipleLi_do_sum(const std::vector<int>& s, const std::vector<cln::cl_N>& x)
{
+ // ensure all x <> 0.
+ for (std::vector<cln::cl_N>::const_iterator it = x.begin(); it != x.end(); ++it) {
+ if ( *it == 0 ) return cln::cl_float(0, cln::float_format(Digits));
+ }
+
const int j = s.size();
+ bool flag_accidental_zero = false;
std::vector<cln::cl_N> t(j);
cln::cl_F one = cln::cl_float(1, cln::float_format(Digits));
int q = 0;
do {
t0buf = t[0];
- // do it once ...
- q++;
- t[j-1] = t[j-1] + cln::expt(x[j-1], q) / cln::expt(cln::cl_I(q),s[j-1]) * one;
- for (int k=j-2; k>=0; k--) {
- t[k] = t[k] + t[k+1] * cln::expt(x[k], q+j-1-k) / cln::expt(cln::cl_I(q+j-1-k), s[k]);
- }
- // ... and do it again (to avoid premature drop out due to special arguments)
q++;
t[j-1] = t[j-1] + cln::expt(x[j-1], q) / cln::expt(cln::cl_I(q),s[j-1]) * one;
for (int k=j-2; k>=0; k--) {
+ flag_accidental_zero = cln::zerop(t[k+1]);
t[k] = t[k] + t[k+1] * cln::expt(x[k], q+j-1-k) / cln::expt(cln::cl_I(q+j-1-k), s[k]);
}
- } while (t[0] != t0buf);
+ } while ( (t[0] != t0buf) || flag_accidental_zero );
return t[0];
}