X-Git-Url: https://www.ginac.de/ginac.git//ginac.git?p=ginac.git;a=blobdiff_plain;f=ginac%2Finifcns_zeta.cpp;h=53eba05bb23107e1119b11568638da5ff954b15f;hp=e343b6fbe2692dc6c2eb92953309b65c0e2ec081;hb=9046466e331b543e9e22db3d9792295d1bbe334c;hpb=d8148ca72f0e9c5f39b7142a87f004a7a5840d69 diff --git a/ginac/inifcns_zeta.cpp b/ginac/inifcns_zeta.cpp index e343b6fb..53eba05b 100644 --- a/ginac/inifcns_zeta.cpp +++ b/ginac/inifcns_zeta.cpp @@ -3,7 +3,7 @@ * Implementation of the Zeta-function and some related stuff. */ /* - * GiNaC Copyright (C) 1999 Johannes Gutenberg University Mainz, Germany + * GiNaC Copyright (C) 1999-2001 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 @@ -24,57 +24,105 @@ #include #include "inifcns.h" -#include "ex.h" #include "constant.h" #include "numeric.h" #include "power.h" #include "symbol.h" +#include "utils.h" -#ifndef NO_GINAC_NAMESPACE namespace GiNaC { -#endif // ndef NO_GINAC_NAMESPACE ////////// // Riemann's Zeta-function ////////// -static ex zeta_eval(ex const & x) +static ex zeta1_evalf(const ex & x) { - if (x.info(info_flags::numeric)) { - numeric y = ex_to_numeric(x); - // trap integer arguments: - if (y.is_integer()) { - if (y.is_zero()) - return -exHALF(); - if (x.is_equal(exONE())) - throw(std::domain_error("zeta(1): infinity")); - if (x.info(info_flags::posint)) { - if (x.info(info_flags::odd)) - return zeta(x).hold(); - else - return abs(bernoulli(y))*pow(Pi,x)*numTWO().power(y-numONE())/factorial(y); - } else { - if (x.info(info_flags::odd)) - return -bernoulli(numONE()-y)/(numONE()-y); - else - return numZERO(); - } - } - } - return zeta(x).hold(); + if (is_exactly_a(x)) { + try { + return zeta(ex_to(x)); + } catch (const dunno &e) { } + } + + return zeta(x).hold(); } -static ex zeta_evalf(ex const & x) +static ex zeta1_eval(const ex & x) { - BEGIN_TYPECHECK - TYPECHECK(x,numeric) - END_TYPECHECK(zeta(x)) - - return zeta(ex_to_numeric(x)); + if (x.info(info_flags::numeric)) { + numeric y = ex_to(x); + // trap integer arguments: + if (y.is_integer()) { + if (y.is_zero()) + return _ex_1_2(); + if (x.is_equal(_ex1())) + throw(std::domain_error("zeta(1): infinity")); + if (x.info(info_flags::posint)) { + if (x.info(info_flags::odd)) + return zeta(x).hold(); + else + return abs(bernoulli(y))*pow(Pi,x)*pow(_num2(),y-_num1())/factorial(y); + } else { + if (x.info(info_flags::odd)) + return -bernoulli(_num1()-y)/(_num1()-y); + else + return _num0(); + } + } + // zeta(float) + if (x.info(info_flags::numeric) && !x.info(info_flags::crational)) + return zeta1_evalf(x); + } + return zeta(x).hold(); } -REGISTER_FUNCTION(zeta, zeta_eval, zeta_evalf, NULL, NULL); +static ex zeta1_deriv(const ex & x, unsigned deriv_param) +{ + GINAC_ASSERT(deriv_param==0); + + return zeta(_ex1(), x); +} + +const unsigned function_index_zeta1 = + function::register_new(function_options("zeta"). + eval_func(zeta1_eval). + evalf_func(zeta1_evalf). + derivative_func(zeta1_deriv). + latex_name("\\zeta"). + overloaded(2)); + +////////// +// Derivatives of Riemann's Zeta-function zeta(0,x)==zeta(x) +////////// + +static ex zeta2_eval(const ex & n, const ex & x) +{ + if (n.info(info_flags::numeric)) { + // zeta(0,x) -> zeta(x) + if (n.is_zero()) + return zeta(x); + } + + return zeta(n, x).hold(); +} + +static ex zeta2_deriv(const ex & n, const ex & x, unsigned deriv_param) +{ + GINAC_ASSERT(deriv_param<2); + + if (deriv_param==0) { + // d/dn zeta(n,x) + throw(std::logic_error("cannot diff zeta(n,x) with respect to n")); + } + // d/dx psi(n,x) + return zeta(n+1,x); +} + +const unsigned function_index_zeta2 = + function::register_new(function_options("zeta"). + eval_func(zeta2_eval). + derivative_func(zeta2_deriv). + latex_name("\\zeta"). + overloaded(2)); -#ifndef NO_GINAC_NAMESPACE } // namespace GiNaC -#endif // ndef NO_GINAC_NAMESPACE