/** @file inifcns_nstdsums.cpp * * Implementation of some special functions that have a representation as nested sums. * * The functions are: * classical polylogarithm Li(n,x) * multiple polylogarithm Li(lst(m_1,...,m_k),lst(x_1,...,x_k)) * nielsen's generalized polylogarithm S(n,p,x) * harmonic polylogarithm H(m,x) or H(lst(m_1,...,m_k),x) * multiple zeta value zeta(m) or zeta(lst(m_1,...,m_k)) * alternating Euler sum zeta(m,s) or zeta(lst(m_1,...,m_k),lst(s_1,...,s_k)) * * Some remarks: * * - All formulae used can be looked up in the following publications: * [Kol] Nielsen's Generalized Polylogarithms, K.S.Kolbig, SIAM J.Math.Anal. 17 (1986), pp. 1232-1258. * [Cra] Fast Evaluation of Multiple Zeta Sums, R.E.Crandall, Math.Comp. 67 (1998), pp. 1163-1172. * [ReV] Harmonic Polylogarithms, E.Remiddi, J.A.M.Vermaseren, Int.J.Mod.Phys. A15 (2000), pp. 725-754 * [BBB] Special Values of Multiple Polylogarithms, J.Borwein, D.Bradley, D.Broadhurst, P.Lisonek, Trans.Amer.Math.Soc. 353/3 (2001), pp. 907-941 * * - The order of parameters and arguments of Li and zeta is defined according to the nested sums * representation. The parameters for H are understood as in [ReV]. They can be in expanded --- only * 0, 1 and -1 --- or in compactified --- a string with zeros in front of 1 or -1 is written as a single * number --- notation. * * - Except for the multiple polylogarithm all functions can be nummerically evaluated with arguments in * the whole complex plane. Multiple polylogarithms evaluate only if for each argument x_i the product * x_1 * x_2 * ... * x_i is smaller than one. The parameters for Li, zeta and S must be positive integers. * If you want to have an alternating Euler sum, you have to give the signs of the parameters as a * second argument s to zeta(m,s) containing 1 and -1. * * - The calculation of classical polylogarithms is speeded up by using Bernoulli numbers and * look-up tables. S uses look-up tables as well. The zeta function applies the algorithms in * [Cra] and [BBB] for speed up. * * - The functions have no series expansion into nested sums. To do this, you have to convert these functions * into the appropriate objects from the nestedsums library, do the expansion and convert the * result back. * * - Numerical testing of this implementation has been performed by doing a comparison of results * between this software and the commercial M.......... 4.1. Multiple zeta values have been checked * by means of evaluations into simple zeta values. Harmonic polylogarithms have been checked by * comparison to S(n,p,x) for corresponding parameter combinations and by continuity checks * around |x|=1 along with comparisons to corresponding zeta functions. * */ /* * GiNaC Copyright (C) 1999-2004 Johannes Gutenberg University Mainz, Germany * * This program is free software; you can redistribute it and/or modify * it under the terms of the GNU General Public License as published by * the Free Software Foundation; either version 2 of the License, or * (at your option) any later version. * * This program is distributed in the hope that it will be useful, * but WITHOUT ANY WARRANTY; without even the implied warranty of * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the * GNU General Public License for more details. * * You should have received a copy of the GNU General Public License * along with this program; if not, write to the Free Software * Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA */ #include #include #include #include "inifcns.h" #include "add.h" #include "constant.h" #include "lst.h" #include "mul.h" #include "numeric.h" #include "operators.h" #include "power.h" #include "pseries.h" #include "relational.h" #include "symbol.h" #include "utils.h" #include "wildcard.h" namespace GiNaC { ////////////////////////////////////////////////////////////////////// // // Classical polylogarithm Li(n,x) // // helper functions // ////////////////////////////////////////////////////////////////////// // anonymous namespace for helper functions namespace { // lookup table for factors built from Bernoulli numbers // see fill_Xn() std::vector > Xn; // initial size of Xn that should suffice for 32bit machines (must be even) const int xninitsizestep = 26; int xninitsize = xninitsizestep; int xnsize = 0; // This function calculates the X_n. The X_n are needed for speed up of classical polylogarithms. // With these numbers the polylogs can be calculated as follows: // Li_p (x) = \sum_{n=0}^\infty X_{p-2}(n) u^{n+1}/(n+1)! with u = -log(1-x) // X_0(n) = B_n (Bernoulli numbers) // X_p(n) = \sum_{k=0}^n binomial(n,k) B_{n-k} / (k+1) * X_{p-1}(k) // The calculation of Xn depends on X0 and X{n-1}. // X_0 is special, it holds only the non-zero Bernoulli numbers with index 2 or greater. // This results in a slightly more complicated algorithm for the X_n. // The first index in Xn corresponds to the index of the polylog minus 2. // The second index in Xn corresponds to the index from the actual sum. void fill_Xn(int n) { if (n>1) { // calculate X_2 and higher (corresponding to Li_4 and higher) std::vector buf(xninitsize); std::vector::iterator it = buf.begin(); cln::cl_N result; *it = -(cln::expt(cln::cl_I(2),n+1) - 1) / cln::expt(cln::cl_I(2),n+1); // i == 1 it++; for (int i=2; i<=xninitsize; i++) { if (i&1) { result = 0; // k == 0 } else { result = Xn[0][i/2-1]; // k == 0 } for (int k=1; k 1)) ) { result = result + cln::binomial(i,k) * Xn[0][(i-k)/2-1] * Xn[n-1][k-1] / (k+1); } } result = result - cln::binomial(i,i-1) * Xn[n-1][i-2] / 2 / i; // k == i-1 result = result + Xn[n-1][i-1] / (i+1); // k == i *it = result; it++; } Xn.push_back(buf); } else if (n==1) { // special case to handle the X_0 correct std::vector buf(xninitsize); std::vector::iterator it = buf.begin(); cln::cl_N result; *it = cln::cl_I(-3)/cln::cl_I(4); // i == 1 it++; *it = cln::cl_I(17)/cln::cl_I(36); // i == 2 it++; for (int i=3; i<=xninitsize; i++) { if (i & 1) { result = -Xn[0][(i-3)/2]/2; *it = (cln::binomial(i,1)/cln::cl_I(2) + cln::binomial(i,i-1)/cln::cl_I(i))*result; it++; } else { result = Xn[0][i/2-1] + Xn[0][i/2-1]/(i+1); for (int k=1; k buf(xninitsize/2); std::vector::iterator it = buf.begin(); for (int i=1; i<=xninitsize/2; i++) { *it = bernoulli(i*2).to_cl_N(); it++; } Xn.push_back(buf); } xnsize++; } // doubles the number of entries in each Xn[] void double_Xn() { const int pos0 = xninitsize / 2; // X_0 for (int i=1; i<=xninitsizestep/2; ++i) { Xn[0].push_back(bernoulli((i+pos0)*2).to_cl_N()); } if (Xn.size() > 0) { int xend = xninitsize + xninitsizestep; cln::cl_N result; // X_1 for (int i=xninitsize+1; i<=xend; ++i) { if (i & 1) { result = -Xn[0][(i-3)/2]/2; Xn[1].push_back((cln::binomial(i,1)/cln::cl_I(2) + cln::binomial(i,i-1)/cln::cl_I(i))*result); } else { result = Xn[0][i/2-1] + Xn[0][i/2-1]/(i+1); for (int k=1; k 1)) ) { result = result + cln::binomial(i,k) * Xn[0][(i-k)/2-1] * Xn[n-1][k-1] / (k+1); } } result = result - cln::binomial(i,i-1) * Xn[n-1][i-2] / 2 / i; // k == i-1 result = result + Xn[n-1][i-1] / (i+1); // k == i Xn[n].push_back(result); } } } xninitsize += xninitsizestep; } // calculates Li(2,x) without Xn cln::cl_N Li2_do_sum(const cln::cl_N& x) { cln::cl_N res = x; cln::cl_N resbuf; cln::cl_N num = x * cln::cl_float(1, cln::float_format(Digits)); cln::cl_I den = 1; // n^2 = 1 unsigned i = 3; do { resbuf = res; num = num * x; den = den + i; // n^2 = 4, 9, 16, ... i += 2; res = res + num / den; } while (res != resbuf); return res; } // calculates Li(2,x) with Xn cln::cl_N Li2_do_sum_Xn(const cln::cl_N& x) { std::vector::const_iterator it = Xn[0].begin(); std::vector::const_iterator xend = Xn[0].end(); cln::cl_N u = -cln::log(1-x); cln::cl_N factor = u * cln::cl_float(1, cln::float_format(Digits)); cln::cl_N res = u - u*u/4; cln::cl_N resbuf; unsigned i = 1; do { resbuf = res; factor = factor * u*u / (2*i * (2*i+1)); res = res + (*it) * factor; i++; if (++it == xend) { double_Xn(); it = Xn[0].begin() + (i-1); xend = Xn[0].end(); } } while (res != resbuf); return res; } // calculates Li(n,x), n>2 without Xn cln::cl_N Lin_do_sum(int n, const cln::cl_N& x) { cln::cl_N factor = x * cln::cl_float(1, cln::float_format(Digits)); cln::cl_N res = x; cln::cl_N resbuf; int i=2; do { resbuf = res; factor = factor * x; res = res + factor / cln::expt(cln::cl_I(i),n); i++; } while (res != resbuf); return res; } // calculates Li(n,x), n>2 with Xn cln::cl_N Lin_do_sum_Xn(int n, const cln::cl_N& x) { std::vector::const_iterator it = Xn[n-2].begin(); std::vector::const_iterator xend = Xn[n-2].end(); cln::cl_N u = -cln::log(1-x); cln::cl_N factor = u * cln::cl_float(1, cln::float_format(Digits)); cln::cl_N res = u; cln::cl_N resbuf; unsigned i=2; do { resbuf = res; factor = factor * u / i; res = res + (*it) * factor; i++; if (++it == xend) { double_Xn(); it = Xn[n-2].begin() + (i-2); xend = Xn[n-2].end(); } } while (res != resbuf); return res; } // forward declaration needed by function Li_projection and C below numeric S_num(int n, int p, const numeric& x); // helper function for classical polylog Li cln::cl_N Li_projection(int n, const cln::cl_N& x, const cln::float_format_t& prec) { // treat n=2 as special case if (n == 2) { // check if precalculated X0 exists if (xnsize == 0) { fill_Xn(0); } if (cln::realpart(x) < 0.5) { // choose the faster algorithm // the switching point was empirically determined. the optimal point // depends on hardware, Digits, ... so an approx value is okay. // it solves also the problem with precision due to the u=-log(1-x) transformation if (cln::abs(cln::realpart(x)) < 0.25) { return Li2_do_sum(x); } else { return Li2_do_sum_Xn(x); } } else { // choose the faster algorithm if (cln::abs(cln::realpart(x)) > 0.75) { return -Li2_do_sum(1-x) - cln::log(x) * cln::log(1-x) + cln::zeta(2); } else { return -Li2_do_sum_Xn(1-x) - cln::log(x) * cln::log(1-x) + cln::zeta(2); } } } else { // check if precalculated Xn exist if (n > xnsize+1) { for (int i=xnsize; i=12 the "normal" summation always wins against the method with Xn if ((cln::abs(cln::realpart(x)) < 0.3) || (n >= 12)) { return Lin_do_sum(n, x); } else { return Lin_do_sum_Xn(n, x); } } else { cln::cl_N result = -cln::expt(cln::log(x), n-1) * cln::log(1-x) / cln::factorial(n-1); for (int j=0; j(cln::realpart(value))); else if (!x.imag().is_rational()) prec = cln::float_format(cln::the(cln::imagpart(value))); // [Kol] (5.15) if (cln::abs(value) > 1) { cln::cl_N result = -cln::expt(cln::log(-value),n) / cln::factorial(n); // check if argument is complex. if it is real, the new polylog has to be conjugated. if (cln::zerop(cln::imagpart(value))) { if (n & 1) { result = result + conjugate(Li_projection(n, cln::recip(value), prec)); } else { result = result - conjugate(Li_projection(n, cln::recip(value), prec)); } } else { if (n & 1) { result = result + Li_projection(n, cln::recip(value), prec); } else { result = result - Li_projection(n, cln::recip(value), prec); } } cln::cl_N add; for (int j=0; j& s, const std::vector& x) { const int j = s.size(); std::vector t(j); cln::cl_F one = cln::cl_float(1, cln::float_format(Digits)); cln::cl_N t0buf; 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--) { 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); return t[0]; } // forward declaration for Li_eval() lst convert_parameter_Li_to_H(const lst& m, const lst& x, ex& pf); } // end of anonymous namespace ////////////////////////////////////////////////////////////////////// // // Classical polylogarithm and multiple polylogarithm Li(n,x) // // GiNaC function // ////////////////////////////////////////////////////////////////////// static ex Li_evalf(const ex& x1, const ex& x2) { // classical polylogs if (is_a(x1) && is_a(x2)) { return Li_num(ex_to(x1).to_int(), ex_to(x2)); } // multiple polylogs else if (is_a(x1) && is_a(x2)) { ex conv = 1; for (int i=0; i(x2.op(i))) { return Li(x1, x2).hold(); } conv *= x2.op(i); if (abs(conv) >= 1) { return Li(x1, x2).hold(); } } std::vector m; std::vector x; for (int i=0; i(x1.nops()).to_int(); i++) { m.push_back(ex_to(x1.op(i)).to_int()); x.push_back(ex_to(x2.op(i)).to_cl_N()); } return numeric(multipleLi_do_sum(m, x)); } return Li(x1,x2).hold(); } static ex Li_eval(const ex& m_, const ex& x_) { if (m_.nops() < 2) { ex m; if (is_a(m_)) { m = m_.op(0); } else { m = m_; } ex x; if (is_a(x_)) { x = x_.op(0); } else { x = x_; } if (x == _ex0) { return _ex0; } if (x == _ex1) { return zeta(m); } if (x == _ex_1) { return (pow(2,1-m)-1) * zeta(m); } if (m == _ex1) { return -log(1-x); } if (m.info(info_flags::posint) && x.info(info_flags::numeric) && (!x.info(info_flags::crational))) { return Li_num(ex_to(m).to_int(), ex_to(x)); } } else { bool ish = true; bool iszeta = true; bool iszero = false; bool doevalf = false; bool doevalfveto = true; const lst& m = ex_to(m_); const lst& x = ex_to(x_); lst::const_iterator itm = m.begin(); lst::const_iterator itx = x.begin(); for (; itm != m.end(); itm++, itx++) { if (!(*itm).info(info_flags::posint)) { return Li(m_, x_).hold(); } if ((*itx != _ex1) && (*itx != _ex_1)) { if (itx != x.begin()) { ish = false; } iszeta = false; } if (*itx == _ex0) { iszero = true; } if (!(*itx).info(info_flags::numeric)) { doevalfveto = false; } if (!(*itx).info(info_flags::crational)) { doevalf = true; } } if (iszeta) { return zeta(m_, x_); } if (iszero) { return _ex0; } if (ish) { ex pf; lst newm = convert_parameter_Li_to_H(m, x, pf); return pf * H(newm, x[0]); } if (doevalfveto && doevalf) { return Li(m_, x_).evalf(); } } return Li(m_, x_).hold(); } static ex Li_series(const ex& m, const ex& x, const relational& rel, int order, unsigned options) { epvector seq; seq.push_back(expair(Li(m, x), 0)); return pseries(rel, seq); } static ex Li_deriv(const ex& m_, const ex& x_, unsigned deriv_param) { GINAC_ASSERT(deriv_param < 2); if (deriv_param == 0) { return _ex0; } if (m_.nops() > 1) { throw std::runtime_error("don't know how to derivate multiple polylogarithm!"); } ex m; if (is_a(m_)) { m = m_.op(0); } else { m = m_; } ex x; if (is_a(x_)) { x = x_.op(0); } else { x = x_; } if (m > 0) { return Li(m-1, x) / x; } else { return 1/(1-x); } } static void Li_print_latex(const ex& m_, const ex& x_, const print_context& c) { lst m; if (is_a(m_)) { m = ex_to(m_); } else { m = lst(m_); } lst x; if (is_a(x_)) { x = ex_to(x_); } else { x = lst(x_); } c.s << "\\mbox{Li}_{"; lst::const_iterator itm = m.begin(); (*itm).print(c); itm++; for (; itm != m.end(); itm++) { c.s << ","; (*itm).print(c); } c.s << "}("; lst::const_iterator itx = x.begin(); (*itx).print(c); itx++; for (; itx != x.end(); itx++) { c.s << ","; (*itx).print(c); } c.s << ")"; } REGISTER_FUNCTION(Li, evalf_func(Li_evalf). eval_func(Li_eval). series_func(Li_series). derivative_func(Li_deriv). print_func(Li_print_latex). do_not_evalf_params()); ////////////////////////////////////////////////////////////////////// // // Nielsen's generalized polylogarithm S(n,p,x) // // helper functions // ////////////////////////////////////////////////////////////////////// // anonymous namespace for helper functions namespace { // lookup table for special Euler-Zagier-Sums (used for S_n,p(x)) // see fill_Yn() std::vector > Yn; int ynsize = 0; // number of Yn[] int ynlength = 100; // initial length of all Yn[i] // This function calculates the Y_n. The Y_n are needed for the evaluation of S_{n,p}(x). // The Y_n are basically Euler-Zagier sums with all m_i=1. They are subsums in the Z-sum // representing S_{n,p}(x). // The first index in Y_n corresponds to the parameter p minus one, i.e. the depth of the // equivalent Z-sum. // The second index in Y_n corresponds to the running index of the outermost sum in the full Z-sum // representing S_{n,p}(x). // The calculation of Y_n uses the values from Y_{n-1}. void fill_Yn(int n, const cln::float_format_t& prec) { const int initsize = ynlength; //const int initsize = initsize_Yn; cln::cl_N one = cln::cl_float(1, prec); if (n) { std::vector buf(initsize); std::vector::iterator it = buf.begin(); std::vector::iterator itprev = Yn[n-1].begin(); *it = (*itprev) / cln::cl_N(n+1) * one; it++; itprev++; // sums with an index smaller than the depth are zero and need not to be calculated. // calculation starts with depth, which is n+2) for (int i=n+2; i<=initsize+n; i++) { *it = *(it-1) + (*itprev) / cln::cl_N(i) * one; it++; itprev++; } Yn.push_back(buf); } else { std::vector buf(initsize); std::vector::iterator it = buf.begin(); *it = 1 * one; it++; for (int i=2; i<=initsize; i++) { *it = *(it-1) + 1 / cln::cl_N(i) * one; it++; } Yn.push_back(buf); } ynsize++; } // make Yn longer ... void make_Yn_longer(int newsize, const cln::float_format_t& prec) { cln::cl_N one = cln::cl_float(1, prec); Yn[0].resize(newsize); std::vector::iterator it = Yn[0].begin(); it += ynlength; for (int i=ynlength+1; i<=newsize; i++) { *it = *(it-1) + 1 / cln::cl_N(i) * one; it++; } for (int n=1; n::iterator it = Yn[n].begin(); std::vector::iterator itprev = Yn[n-1].begin(); it += ynlength; itprev += ynlength; for (int i=ynlength+n+1; i<=newsize+n; i++) { *it = *(it-1) + (*itprev) / cln::cl_N(i) * one; it++; itprev++; } } ynlength = newsize; } // helper function for S(n,p,x) // [Kol] (7.2) cln::cl_N C(int n, int p) { cln::cl_N result; for (int k=0; k ynsize+1) { for (int i=ynsize; i= ynlength) { // make Yn longer make_Yn_longer(ynlength*2, prec); } res = res + factor / cln::expt(cln::cl_I(i),n+1) * Yn[p-2][i-p]; // should we check it? or rely on magic number? ... //res = res + factor / cln::expt(cln::cl_I(i),n+1) * (*it); // should we check it? or rely on magic number? ... factor = factor * xf; i++; } while (res != resbuf); return res; } // helper function for S(n,p,x) cln::cl_N S_projection(int n, int p, const cln::cl_N& x, const cln::float_format_t& prec) { // [Kol] (5.3) if (cln::abs(cln::realpart(x)) > cln::cl_F("0.5")) { cln::cl_N result = cln::expt(cln::cl_I(-1),p) * cln::expt(cln::log(x),n) * cln::expt(cln::log(1-x),p) / cln::factorial(n) / cln::factorial(p); for (int s=0; s(cln::realpart(value))); else if (!x.imag().is_rational()) prec = cln::float_format(cln::the(cln::imagpart(value))); // [Kol] (5.3) if ((cln::realpart(value) < -0.5) || (n == 0)) { cln::cl_N result = cln::expt(cln::cl_I(-1),p) * cln::expt(cln::log(value),n) * cln::expt(cln::log(1-value),p) / cln::factorial(n) / cln::factorial(p); for (int s=0; s 1) { cln::cl_N result; for (int s=0; s(x)) { return S_num(ex_to(n).to_int(), ex_to(p).to_int(), ex_to(x)); } return S(n, p, x).hold(); } static ex S_eval(const ex& n, const ex& p, const ex& x) { if (n.info(info_flags::posint) && p.info(info_flags::posint)) { if (x == 0) { return _ex0; } if (x == 1) { lst m(n+1); for (int i=ex_to(p).to_int()-1; i>0; i--) { m.append(1); } return zeta(m); } if (p == 1) { return Li(n+1, x); } if (x.info(info_flags::numeric) && (!x.info(info_flags::crational))) { return S_num(ex_to(n).to_int(), ex_to(p).to_int(), ex_to(x)); } } if (n.is_zero()) { // [Kol] (5.3) return pow(-log(1-x), p) / factorial(p); } return S(n, p, x).hold(); } static ex S_series(const ex& n, const ex& p, const ex& x, const relational& rel, int order, unsigned options) { epvector seq; seq.push_back(expair(S(n, p, x), 0)); return pseries(rel, seq); } static ex S_deriv(const ex& n, const ex& p, const ex& x, unsigned deriv_param) { GINAC_ASSERT(deriv_param < 3); if (deriv_param < 2) { return _ex0; } if (n > 0) { return S(n-1, p, x) / x; } else { return S(n, p-1, x) / (1-x); } } static void S_print_latex(const ex& n, const ex& p, const ex& x, const print_context& c) { c.s << "\\mbox{S}_{"; n.print(c); c.s << ","; p.print(c); c.s << "}("; x.print(c); c.s << ")"; } REGISTER_FUNCTION(S, evalf_func(S_evalf). eval_func(S_eval). series_func(S_series). derivative_func(S_deriv). print_func(S_print_latex). do_not_evalf_params()); ////////////////////////////////////////////////////////////////////// // // Harmonic polylogarithm H(m,x) // // helper functions // ////////////////////////////////////////////////////////////////////// // anonymous namespace for helper functions namespace { // regulates the pole (used by 1/x-transformation) symbol H_polesign("IMSIGN"); // convert parameters from H to Li representation // parameters are expected to be in expanded form, i.e. only 0, 1 and -1 // returns true if some parameters are negative bool convert_parameter_H_to_Li(const lst& l, lst& m, lst& s, ex& pf) { // expand parameter list lst mexp; for (lst::const_iterator it = l.begin(); it != l.end(); it++) { if (*it > 1) { for (ex count=*it-1; count > 0; count--) { mexp.append(0); } mexp.append(1); } else if (*it < -1) { for (ex count=*it+1; count < 0; count++) { mexp.append(0); } mexp.append(-1); } else { mexp.append(*it); } } ex signum = 1; pf = 1; bool has_negative_parameters = false; ex acc = 1; for (lst::const_iterator it = mexp.begin(); it != mexp.end(); it++) { if (*it == 0) { acc++; continue; } if (*it > 0) { m.append((*it+acc-1) * signum); } else { m.append((*it-acc+1) * signum); } acc = 1; signum = *it; pf *= *it; if (pf < 0) { has_negative_parameters = true; } } if (has_negative_parameters) { for (int i=0; i(e) || is_a(e)) { return e.map(*this); } if (is_a(e)) { std::string name = ex_to(e).get_name(); if (name == "H") { lst parameter; if (is_a(e.op(0))) { parameter = ex_to(e.op(0)); } else { parameter = lst(e.op(0)); } ex arg = e.op(1); lst m; lst s; ex pf; if (convert_parameter_H_to_Li(parameter, m, s, pf)) { s.let_op(0) = s.op(0) * arg; return pf * Li(m, s).hold(); } else { for (int i=0; i(e) || is_a(e)) { return e.map(*this); } if (is_a(e)) { std::string name = ex_to(e).get_name(); if (name == "H") { lst parameter; if (is_a(e.op(0))) { parameter = ex_to(e.op(0)); } else { parameter = lst(e.op(0)); } lst m; lst s; ex pf; if (convert_parameter_H_to_Li(parameter, m, s, pf)) { return pf * zeta(m, s); } else { return zeta(m); } } } return e; } }; // remove trailing zeros from H-parameters struct map_trafo_H_reduce_trailing_zeros : public map_function { ex operator()(const ex& e) { if (is_a(e) || is_a(e)) { return e.map(*this); } if (is_a(e)) { std::string name = ex_to(e).get_name(); if (name == "H") { lst parameter; if (is_a(e.op(0))) { parameter = ex_to(e.op(0)); } else { parameter = lst(e.op(0)); } ex arg = e.op(1); if (parameter.op(parameter.nops()-1) == 0) { // if (parameter.nops() == 1) { return log(arg); } // lst::const_iterator it = parameter.begin(); while ((it != parameter.end()) && (*it == 0)) { it++; } if (it == parameter.end()) { return pow(log(arg),parameter.nops()) / factorial(parameter.nops()); } // parameter.remove_last(); int lastentry = parameter.nops(); while ((lastentry > 0) && (parameter[lastentry-1] == 0)) { lastentry--; } // ex result = log(arg) * H(parameter,arg).hold(); ex acc = 0; for (ex i=0; i 0) { parameter[i]++; result -= (acc + parameter[i]-1) * H(parameter, arg).hold(); parameter[i]--; acc = 0; } else if (parameter[i] < 0) { parameter[i]--; result -= (acc + abs(parameter[i]+1)) * H(parameter, arg).hold(); parameter[i]++; acc = 0; } else { acc++; } } if (lastentry < parameter.nops()) { result = result / (parameter.nops()-lastentry+1); return result.map(*this); } else { return result; } } } } return e; } }; // returns an expression with zeta functions corresponding to the parameter list for H ex convert_H_to_zeta(const lst& m) { symbol xtemp("xtemp"); map_trafo_H_reduce_trailing_zeros filter; map_trafo_H_convert_to_zeta filter2; return filter2(filter(H(m, xtemp).hold())).subs(xtemp == 1); } // convert signs form Li to H representation lst convert_parameter_Li_to_H(const lst& m, const lst& x, ex& pf) { lst res; lst::const_iterator itm = m.begin(); lst::const_iterator itx = ++x.begin(); ex signum = _ex1; pf = _ex1; res.append(*itm); itm++; while (itx != x.end()) { signum *= *itx; pf *= signum; res.append((*itm) * signum); itm++; itx++; } return res; } // multiplies an one-dimensional H with another H // [ReV] (18) ex trafo_H_mult(const ex& h1, const ex& h2) { ex res; ex hshort; lst hlong; ex h1nops = h1.op(0).nops(); ex h2nops = h2.op(0).nops(); if (h1nops > 1) { hshort = h2.op(0).op(0); hlong = ex_to(h1.op(0)); } else { hshort = h1.op(0).op(0); if (h2nops > 1) { hlong = ex_to(h2.op(0)); } else { hlong = h2.op(0).op(0); } } for (int i=0; i<=hlong.nops(); i++) { lst newparameter; int j=0; for (; j(e)) { return e.map(*this); } if (is_a(e)) { ex result = 1; ex firstH; lst Hlst; for (int pos=0; pos(e.op(pos)) && is_a(e.op(pos).op(0))) { std::string name = ex_to(e.op(pos).op(0)).get_name(); if (name == "H") { for (ex i=0; i(e.op(pos))) { std::string name = ex_to(e.op(pos)).get_name(); if (name == "H") { if (e.op(pos).op(0).nops() > 1) { firstH = e.op(pos); } else { Hlst.append(e.op(pos)); } continue; } } result *= e.op(pos); } if (firstH == 0) { if (Hlst.nops() > 0) { firstH = Hlst[Hlst.nops()-1]; Hlst.remove_last(); } else { return e; } } if (Hlst.nops() > 0) { ex buffer = trafo_H_mult(firstH, Hlst.op(0)); result *= buffer; for (int i=1; i(e)) { name = ex_to(e).get_name(); } if (name == "H") { h = e; } else { for (int i=0; i(e.op(i))) { std::string name = ex_to(e.op(i)).get_name(); if (name == "H") { h = e.op(i); } } } } if (h != 0) { lst newparameter = ex_to(h.op(0)); newparameter.prepend(0); ex addzeta = convert_H_to_zeta(newparameter); return e.subs(h == (addzeta-H(newparameter, h.op(1)).hold())).expand(); } else { return e * (-H(lst(0),1/arg).hold()); } } // do integration [ReV] (55) // put parameter -1 in front of existing parameters ex trafo_H_1tx_prepend_minusone(const ex& e, const ex& arg) { ex h; std::string name; if (is_a(e)) { name = ex_to(e).get_name(); } if (name == "H") { h = e; } else { for (int i=0; i(e.op(i))) { std::string name = ex_to(e.op(i)).get_name(); if (name == "H") { h = e.op(i); } } } } if (h != 0) { lst newparameter = ex_to(h.op(0)); newparameter.prepend(-1); ex addzeta = convert_H_to_zeta(newparameter); return e.subs(h == (addzeta-H(newparameter, h.op(1)).hold())).expand(); } else { ex addzeta = convert_H_to_zeta(lst(-1)); return (e * (addzeta - H(lst(-1),1/arg).hold())).expand(); } } // do integration [ReV] (55) // put parameter -1 in front of existing parameters ex trafo_H_1mxt1px_prepend_minusone(const ex& e, const ex& arg) { ex h; std::string name; if (is_a(e)) { name = ex_to(e).get_name(); } if (name == "H") { h = e; } else { for (int i=0; i(e.op(i))) { std::string name = ex_to(e.op(i)).get_name(); if (name == "H") { h = e.op(i); } } } } if (h != 0) { lst newparameter = ex_to(h.op(0)); newparameter.prepend(-1); return e.subs(h == H(newparameter, h.op(1)).hold()).expand(); } else { return (e * H(lst(-1),(1-arg)/(1+arg)).hold()).expand(); } } // do integration [ReV] (55) // put parameter 1 in front of existing parameters ex trafo_H_1mxt1px_prepend_one(const ex& e, const ex& arg) { ex h; std::string name; if (is_a(e)) { name = ex_to(e).get_name(); } if (name == "H") { h = e; } else { for (int i=0; i(e.op(i))) { std::string name = ex_to(e.op(i)).get_name(); if (name == "H") { h = e.op(i); } } } } if (h != 0) { lst newparameter = ex_to(h.op(0)); newparameter.prepend(1); return e.subs(h == H(newparameter, h.op(1)).hold()).expand(); } else { return (e * H(lst(1),(1-arg)/(1+arg)).hold()).expand(); } } // do x -> 1/x transformation struct map_trafo_H_1overx : public map_function { ex operator()(const ex& e) { if (is_a(e) || is_a(e)) { return e.map(*this); } if (is_a(e)) { std::string name = ex_to(e).get_name(); if (name == "H") { lst parameter = ex_to(e.op(0)); ex arg = e.op(1); // special cases if all parameters are either 0, 1 or -1 bool allthesame = true; if (parameter.op(0) == 0) { for (int i=1; i(buffer)) { for (int i=0; i(buffer)) { for (int i=0; i (1-x)/(1+x) transformation struct map_trafo_H_1mxt1px : public map_function { ex operator()(const ex& e) { if (is_a(e) || is_a(e)) { return e.map(*this); } if (is_a(e)) { std::string name = ex_to(e).get_name(); if (name == "H") { lst parameter = ex_to(e.op(0)); ex arg = e.op(1); // special cases if all parameters are either 0, 1 or -1 bool allthesame = true; if (parameter.op(0) == 0) { for (int i=1; i(buffer)) { for (int i=0; i(buffer)) { for (int i=0; i& m, const cln::cl_N& x) { const int j = m.size(); std::vector t(j); cln::cl_F one = cln::cl_float(1, cln::float_format(Digits)); cln::cl_N factor = cln::expt(x, j) * one; cln::cl_N t0buf; int q = 0; do { t0buf = t[0]; q++; t[j-1] = t[j-1] + 1 / cln::expt(cln::cl_I(q),m[j-1]); for (int k=j-2; k>=1; k--) { t[k] = t[k] + t[k+1] / cln::expt(cln::cl_I(q+j-1-k), m[k]); } t[0] = t[0] + t[1] * factor / cln::expt(cln::cl_I(q+j-1), m[0]); factor = factor * x; } while (t[0] != t0buf); return t[0]; } } // end of anonymous namespace ////////////////////////////////////////////////////////////////////// // // Harmonic polylogarithm H(m,x) // // GiNaC function // ////////////////////////////////////////////////////////////////////// static ex H_evalf(const ex& x1, const ex& x2) { if (is_a(x1) && is_a(x2)) { for (int i=0; i(x2).to_cl_N(); const lst& morg = ex_to(x1); // remove trailing zeros ... if (*(--morg.end()) == 0) { symbol xtemp("xtemp"); map_trafo_H_reduce_trailing_zeros filter; return filter(H(x1, xtemp).hold()).subs(xtemp==x2).evalf(); } // ... and expand parameter notation lst m; for (lst::const_iterator it = morg.begin(); it != morg.end(); it++) { if (*it > 1) { for (ex count=*it-1; count > 0; count--) { m.append(0); } m.append(1); } else if (*it < -1) { for (ex count=*it+1; count < 0; count++) { m.append(0); } m.append(-1); } else { m.append(*it); } } // since the transformations produce a lot of terms, they are only efficient for // argument near one. // no transformation needed -> do summation if (cln::abs(x) < 0.95) { lst m_lst; lst s_lst; ex pf; if (convert_parameter_H_to_Li(m, m_lst, s_lst, pf)) { // negative parameters -> s_lst is filled std::vector m_int; std::vector x_cln; for (lst::const_iterator it_int = m_lst.begin(), it_cln = s_lst.begin(); it_int != m_lst.end(); it_int++, it_cln++) { m_int.push_back(ex_to(*it_int).to_int()); x_cln.push_back(ex_to(*it_cln).to_cl_N()); } x_cln.front() = x_cln.front() * x; return pf * numeric(multipleLi_do_sum(m_int, x_cln)); } else { // only positive parameters //TODO if (m_lst.nops() == 1) { return Li(m_lst.op(0), x2).evalf(); } std::vector m_int; for (lst::const_iterator it = m_lst.begin(); it != m_lst.end(); it++) { m_int.push_back(ex_to(*it).to_int()); } return numeric(H_do_sum(m_int, x)); } } ex res = 1; // ensure that the realpart of the argument is positive if (cln::realpart(x) < 0) { x = -x; for (int i=0; i (1-x)/(1+x) map_trafo_H_1mxt1px trafo; res *= trafo(H(m, xtemp)); } else { // x -> 1/x map_trafo_H_1overx trafo; res *= trafo(H(m, xtemp)); if (cln::imagpart(x) <= 0) { res = res.subs(H_polesign == -I*Pi); } else { res = res.subs(H_polesign == I*Pi); } } // simplify result // TODO // map_trafo_H_convert converter; // res = converter(res).expand(); // lst ll; // res.find(H(wild(1),wild(2)), ll); // res.find(zeta(wild(1)), ll); // res.find(zeta(wild(1),wild(2)), ll); // res = res.collect(ll); return res.subs(xtemp == numeric(x)).evalf(); } return H(x1,x2).hold(); } static ex H_eval(const ex& m_, const ex& x) { lst m; if (is_a(m_)) { m = ex_to(m_); } else { m = lst(m_); } if (m.nops() == 0) { return _ex1; } ex pos1; ex pos2; ex n; ex p; int step = 0; if (*m.begin() > _ex1) { step++; pos1 = _ex0; pos2 = _ex1; n = *m.begin()-1; p = _ex1; } else if (*m.begin() < _ex_1) { step++; pos1 = _ex0; pos2 = _ex_1; n = -*m.begin()-1; p = _ex1; } else if (*m.begin() == _ex0) { pos1 = _ex0; n = _ex1; } else { pos1 = *m.begin(); p = _ex1; } for (lst::const_iterator it = ++m.begin(); it != m.end(); it++) { if ((*it).info(info_flags::integer)) { if (step == 0) { if (*it > _ex1) { if (pos1 == _ex0) { step = 1; pos2 = _ex1; n += *it-1; p = _ex1; } else { step = 2; } } else if (*it < _ex_1) { if (pos1 == _ex0) { step = 1; pos2 = _ex_1; n += -*it-1; p = _ex1; } else { step = 2; } } else { if (*it != pos1) { step = 1; pos2 = *it; } if (*it == _ex0) { n++; } else { p++; } } } else if (step == 1) { if (*it != pos2) { step = 2; } else { if (*it == _ex0) { n++; } else { p++; } } } } else { // if some m_i is not an integer return H(m_, x).hold(); } } if ((x == _ex1) && (*(--m.end()) != _ex0)) { return convert_H_to_zeta(m); } if (step == 0) { if (pos1 == _ex0) { // all zero if (x == _ex0) { return H(m_, x).hold(); } return pow(log(x), m.nops()) / factorial(m.nops()); } else { // all (minus) one return pow(-pos1*log(1-pos1*x), m.nops()) / factorial(m.nops()); } } else if ((step == 1) && (pos1 == _ex0)){ // convertible to S if (pos2 == _ex1) { return S(n, p, x); } else { return pow(-1, p) * S(n, p, -x); } } if (x == _ex0) { return _ex0; } if (x.info(info_flags::numeric) && (!x.info(info_flags::crational))) { return H(m_, x).evalf(); } return H(m_, x).hold(); } static ex H_series(const ex& m, const ex& x, const relational& rel, int order, unsigned options) { epvector seq; seq.push_back(expair(H(m, x), 0)); return pseries(rel, seq); } static ex H_deriv(const ex& m_, const ex& x, unsigned deriv_param) { GINAC_ASSERT(deriv_param < 2); if (deriv_param == 0) { return _ex0; } lst m; if (is_a(m_)) { m = ex_to(m_); } else { m = lst(m_); } ex mb = *m.begin(); if (mb > _ex1) { m[0]--; return H(m, x) / x; } if (mb < _ex_1) { m[0]++; return H(m, x) / x; } m.remove_first(); if (mb == _ex1) { return 1/(1-x) * H(m, x); } else if (mb == _ex_1) { return 1/(1+x) * H(m, x); } else { return H(m, x) / x; } } static void H_print_latex(const ex& m_, const ex& x, const print_context& c) { lst m; if (is_a(m_)) { m = ex_to(m_); } else { m = lst(m_); } c.s << "\\mbox{H}_{"; lst::const_iterator itm = m.begin(); (*itm).print(c); itm++; for (; itm != m.end(); itm++) { c.s << ","; (*itm).print(c); } c.s << "}("; x.print(c); c.s << ")"; } REGISTER_FUNCTION(H, evalf_func(H_evalf). eval_func(H_eval). series_func(H_series). derivative_func(H_deriv). print_func(H_print_latex). do_not_evalf_params()); // takes a parameter list for H and returns an expression with corresponding multiple polylogarithms ex convert_H_to_Li(const ex& m, const ex& x) { map_trafo_H_reduce_trailing_zeros filter; map_trafo_H_convert_to_Li filter2; if (is_a(m)) { return filter2(filter(H(m, x).hold())); } else { return filter2(filter(H(lst(m), x).hold())); } } ////////////////////////////////////////////////////////////////////// // // Multiple zeta values zeta(x) and zeta(x,s) // // helper functions // ////////////////////////////////////////////////////////////////////// // anonymous namespace for helper functions namespace { // parameters and data for [Cra] algorithm const cln::cl_N lambda = cln::cl_N("319/320"); int L1; int L2; std::vector > f_kj; std::vector crB; std::vector > crG; std::vector crX; void halfcyclic_convolute(const std::vector& a, const std::vector& b, std::vector& c) { const int size = a.size(); for (int n=0; n& s) { const int k = s.size(); crX.clear(); crG.clear(); crB.clear(); for (int i=0; i<=L2; i++) { crB.push_back(bernoulli(i).to_cl_N() / cln::factorial(i)); } int Sm = 0; int Smp1 = 0; for (int m=0; m crGbuf; Sm = Sm + s[m]; Smp1 = Sm + s[m+1]; for (int i=0; i<=L2; i++) { crGbuf.push_back(cln::factorial(i + Sm - m - 2) / cln::factorial(i + Smp1 - m - 2)); } crG.push_back(crGbuf); } crX = crB; for (int m=0; m Xbuf; for (int i=0; i<=L2; i++) { Xbuf.push_back(crX[i] * crG[m][i]); } halfcyclic_convolute(Xbuf, crB, crX); } } // [Cra] section 4 cln::cl_N crandall_Y_loop(const cln::cl_N& Sqk) { cln::cl_F one = cln::cl_float(1, cln::float_format(Digits)); cln::cl_N factor = cln::expt(lambda, Sqk); cln::cl_N res = factor / Sqk * crX[0] * one; cln::cl_N resbuf; int N = 0; do { resbuf = res; factor = factor * lambda; N++; res = res + crX[N] * factor / (N+Sqk); } while ((res != resbuf) || cln::zerop(crX[N])); return res; } // [Cra] section 4 void calc_f(int maxr) { f_kj.clear(); f_kj.resize(L1); cln::cl_N t0, t1, t2, t3, t4; int i, j, k; std::vector >::iterator it = f_kj.begin(); cln::cl_F one = cln::cl_float(1, cln::float_format(Digits)); t0 = cln::exp(-lambda); t2 = 1; for (k=1; k<=L1; k++) { t1 = k * lambda; t2 = t0 * t2; for (j=1; j<=maxr; j++) { t3 = 1; t4 = 1; for (i=2; i<=j; i++) { t4 = t4 * (j-i+1); t3 = t1 * t3 + t4; } (*it).push_back(t2 * t3 * cln::expt(cln::cl_I(k),-j) * one); } it++; } } // [Cra] (3.1) cln::cl_N crandall_Z(const std::vector& s) { const int j = s.size(); if (j == 1) { cln::cl_N t0; cln::cl_N t0buf; int q = 0; do { t0buf = t0; q++; t0 = t0 + f_kj[q+j-2][s[0]-1]; } while (t0 != t0buf); return t0 / cln::factorial(s[0]-1); } std::vector t(j); cln::cl_N t0buf; int q = 0; do { t0buf = t[0]; q++; t[j-1] = t[j-1] + 1 / cln::expt(cln::cl_I(q),s[j-1]); for (int k=j-2; k>=1; k--) { t[k] = t[k] + t[k+1] / cln::expt(cln::cl_I(q+j-1-k), s[k]); } t[0] = t[0] + t[1] * f_kj[q+j-2][s[0]-1]; } while (t[0] != t0buf); return t[0] / cln::factorial(s[0]-1); } // [Cra] (2.4) cln::cl_N zeta_do_sum_Crandall(const std::vector& s) { std::vector r = s; const int j = r.size(); // decide on maximal size of f_kj for crandall_Z if (Digits < 50) { L1 = 150; } else { L1 = Digits * 3 + j*2; } // decide on maximal size of crX for crandall_Y if (Digits < 38) { L2 = 63; } else if (Digits < 86) { L2 = 127; } else if (Digits < 192) { L2 = 255; } else if (Digits < 394) { L2 = 511; } else if (Digits < 808) { L2 = 1023; } else { L2 = 2047; } cln::cl_N res; int maxr = 0; int S = 0; for (int i=0; i maxr) { maxr = r[i]; } } calc_f(maxr); const cln::cl_N r0factorial = cln::factorial(r[0]-1); std::vector rz; int skp1buf; int Srun = S; for (int k=r.size()-1; k>0; k--) { rz.insert(rz.begin(), r.back()); skp1buf = rz.front(); Srun -= skp1buf; r.pop_back(); initcX(r); for (int q=0; q& r) { const int j = r.size(); // buffer for subsums std::vector t(j); cln::cl_F one = cln::cl_float(1, cln::float_format(Digits)); cln::cl_N t0buf; int q = 0; do { t0buf = t[0]; q++; t[j-1] = t[j-1] + one / cln::expt(cln::cl_I(q),r[j-1]); for (int k=j-2; k>=0; k--) { t[k] = t[k] + one * t[k+1] / cln::expt(cln::cl_I(q+j-1-k), r[k]); } } while (t[0] != t0buf); return t[0]; } // does Hoelder convolution. see [BBB] (7.0) cln::cl_N zeta_do_Hoelder_convolution(const std::vector& m_, const std::vector& s_) { // prepare parameters // holds Li arguments in [BBB] notation std::vector s = s_; std::vector m_p = m_; std::vector m_q; // holds Li arguments in nested sums notation std::vector s_p(s.size(), cln::cl_N(1)); s_p[0] = s_p[0] * cln::cl_N("1/2"); // convert notations int sig = 1; for (int i=0; i s_q; cln::cl_N signum = 1; // first term cln::cl_N res = multipleLi_do_sum(m_p, s_p); // middle terms do { // change parameters if (s.front() > 0) { if (m_p.front() == 1) { m_p.erase(m_p.begin()); s_p.erase(s_p.begin()); if (s_p.size() > 0) { s_p.front() = s_p.front() * cln::cl_N("1/2"); } s.erase(s.begin()); m_q.front()++; } else { m_p.front()--; m_q.insert(m_q.begin(), 1); if (s_q.size() > 0) { s_q.front() = s_q.front() * 2; } s_q.insert(s_q.begin(), cln::cl_N("1/2")); } } else { if (m_p.front() == 1) { m_p.erase(m_p.begin()); cln::cl_N spbuf = s_p.front(); s_p.erase(s_p.begin()); if (s_p.size() > 0) { s_p.front() = s_p.front() * spbuf; } s.erase(s.begin()); m_q.insert(m_q.begin(), 1); if (s_q.size() > 0) { s_q.front() = s_q.front() * 4; } s_q.insert(s_q.begin(), cln::cl_N("1/4")); signum = -signum; } else { m_p.front()--; m_q.insert(m_q.begin(), 1); if (s_q.size() > 0) { s_q.front() = s_q.front() * 2; } s_q.insert(s_q.begin(), cln::cl_N("1/2")); } } // exiting the loop if (m_p.size() == 0) break; res = res + signum * multipleLi_do_sum(m_p, s_p) * multipleLi_do_sum(m_q, s_q); } while (true); // last term res = res + signum * multipleLi_do_sum(m_q, s_q); return res; } } // end of anonymous namespace ////////////////////////////////////////////////////////////////////// // // Multiple zeta values zeta(x) // // GiNaC function // ////////////////////////////////////////////////////////////////////// static ex zeta1_evalf(const ex& x) { if (is_exactly_a(x) && (x.nops()>1)) { // multiple zeta value const int count = x.nops(); const lst& xlst = ex_to(x); std::vector r(count); // check parameters and convert them lst::const_iterator it1 = xlst.begin(); std::vector::iterator it2 = r.begin(); do { if (!(*it1).info(info_flags::posint)) { return zeta(x).hold(); } *it2 = ex_to(*it1).to_int(); it1++; it2++; } while (it2 != r.end()); // check for divergence if (r[0] == 1) { return zeta(x).hold(); } // decide on summation algorithm // this is still a bit clumsy int limit = (Digits>17) ? 10 : 6; if ((r[0] < limit) || ((count > 3) && (r[1] < limit/2))) { return numeric(zeta_do_sum_Crandall(r)); } else { return numeric(zeta_do_sum_simple(r)); } } // single zeta value if (is_exactly_a(x) && (x != 1)) { try { return zeta(ex_to(x)); } catch (const dunno &e) { } } return zeta(x).hold(); } static ex zeta1_eval(const ex& m) { if (is_exactly_a(m)) { if (m.nops() == 1) { return zeta(m.op(0)); } return zeta(m).hold(); } if (m.info(info_flags::numeric)) { const numeric& y = ex_to(m); // trap integer arguments: if (y.is_integer()) { if (y.is_zero()) { return _ex_1_2; } if (y.is_equal(_num1)) { return zeta(m).hold(); } if (y.info(info_flags::posint)) { if (y.info(info_flags::odd)) { return zeta(m).hold(); } else { return abs(bernoulli(y)) * pow(Pi, y) * pow(_num2, y-_num1) / factorial(y); } } else { if (y.info(info_flags::odd)) { return -bernoulli(_num1-y) / (_num1-y); } else { return _ex0; } } } // zeta(float) if (y.info(info_flags::numeric) && !y.info(info_flags::crational)) { return zeta1_evalf(m); } } return zeta(m).hold(); } static ex zeta1_deriv(const ex& m, unsigned deriv_param) { GINAC_ASSERT(deriv_param==0); if (is_exactly_a(m)) { return _ex0; } else { return zetaderiv(_ex1, m); } } static void zeta1_print_latex(const ex& m_, const print_context& c) { c.s << "\\zeta("; if (is_a(m_)) { const lst& m = ex_to(m_); lst::const_iterator it = m.begin(); (*it).print(c); it++; for (; it != m.end(); it++) { c.s << ","; (*it).print(c); } } else { m_.print(c); } c.s << ")"; } unsigned zeta1_SERIAL::serial = function::register_new(function_options("zeta", 1). evalf_func(zeta1_evalf). eval_func(zeta1_eval). derivative_func(zeta1_deriv). print_func(zeta1_print_latex). do_not_evalf_params(). overloaded(2)); ////////////////////////////////////////////////////////////////////// // // Alternating Euler sum zeta(x,s) // // GiNaC function // ////////////////////////////////////////////////////////////////////// static ex zeta2_evalf(const ex& x, const ex& s) { if (is_exactly_a(x)) { // alternating Euler sum const int count = x.nops(); const lst& xlst = ex_to(x); const lst& slst = ex_to(s); std::vector xi(count); std::vector si(count); // check parameters and convert them lst::const_iterator it_xread = xlst.begin(); lst::const_iterator it_sread = slst.begin(); std::vector::iterator it_xwrite = xi.begin(); std::vector::iterator it_swrite = si.begin(); do { if (!(*it_xread).info(info_flags::posint)) { return zeta(x, s).hold(); } *it_xwrite = ex_to(*it_xread).to_int(); if (*it_sread > 0) { *it_swrite = 1; } else { *it_swrite = -1; } it_xread++; it_sread++; it_xwrite++; it_swrite++; } while (it_xwrite != xi.end()); // check for divergence if ((xi[0] == 1) && (si[0] == 1)) { return zeta(x, s).hold(); } // use Hoelder convolution return numeric(zeta_do_Hoelder_convolution(xi, si)); } return zeta(x, s).hold(); } static ex zeta2_eval(const ex& m, const ex& s_) { if (is_exactly_a(s_)) { const lst& s = ex_to(s_); for (lst::const_iterator it = s.begin(); it != s.end(); it++) { if ((*it).info(info_flags::positive)) { continue; } return zeta(m, s_).hold(); } return zeta(m); } else if (s_.info(info_flags::positive)) { return zeta(m); } return zeta(m, s_).hold(); } static ex zeta2_deriv(const ex& m, const ex& s, unsigned deriv_param) { GINAC_ASSERT(deriv_param==0); if (is_exactly_a(m)) { return _ex0; } else { if ((is_exactly_a(s) && s.op(0).info(info_flags::positive)) || s.info(info_flags::positive)) { return zetaderiv(_ex1, m); } return _ex0; } } static void zeta2_print_latex(const ex& m_, const ex& s_, const print_context& c) { lst m; if (is_a(m_)) { m = ex_to(m_); } else { m = lst(m_); } lst s; if (is_a(s_)) { s = ex_to(s_); } else { s = lst(s_); } c.s << "\\zeta("; lst::const_iterator itm = m.begin(); lst::const_iterator its = s.begin(); if (*its < 0) { c.s << "\\overline{"; (*itm).print(c); c.s << "}"; } else { (*itm).print(c); } its++; itm++; for (; itm != m.end(); itm++, its++) { c.s << ","; if (*its < 0) { c.s << "\\overline{"; (*itm).print(c); c.s << "}"; } else { (*itm).print(c); } } c.s << ")"; } unsigned zeta2_SERIAL::serial = function::register_new(function_options("zeta", 2). evalf_func(zeta2_evalf). eval_func(zeta2_eval). derivative_func(zeta2_deriv). print_func(zeta2_print_latex). do_not_evalf_params(). overloaded(2)); } // namespace GiNaC