X-Git-Url: https://www.ginac.de/ginac.git//ginac.git?p=ginac.git;a=blobdiff_plain;f=ginsh%2Fginsh_parser.yy;h=c045826754f5dc2a4c6f9d0a2f7d0a47aec4852d;hp=46ced5b9498ab3f9e8fa9fb5b1b8655d004b6693;hb=eddd1f843746065177daf1965a1ccd1a3d82a3fe;hpb=caa32f46e8ac861b0ac04883cfe40137b6b2763d diff --git a/ginsh/ginsh_parser.yy b/ginsh/ginsh_parser.yy index 46ced5b9..c0458267 100644 --- a/ginsh/ginsh_parser.yy +++ b/ginsh/ginsh_parser.yy @@ -4,7 +4,7 @@ * This file must be processed with yacc/bison. */ /* - * GiNaC Copyright (C) 1999-2002 Johannes Gutenberg University Mainz, Germany + * 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 @@ -50,7 +50,7 @@ static char *orig_basic_word_break_characters; static const char *orig_basic_word_break_characters; #endif -// Expression stack for ", "" and """ +// Expression stack for %, %% and %%% static void push(const ex &e); static ex exstack[3]; @@ -93,7 +93,7 @@ static void print_help_topics(void); %token T_EQUAL T_NOTEQ T_LESSEQ T_GREATEREQ %token T_QUIT T_WARRANTY T_PRINT T_IPRINT T_PRINTLATEX T_PRINTCSRC T_TIME -%token T_XYZZY T_INVENTORY T_LOOK T_SCORE +%token T_XYZZY T_INVENTORY T_LOOK T_SCORE T_COMPLEX_SYMBOLS T_REAL_SYMBOLS /* Operator precedence and associativity */ %right '=' @@ -175,6 +175,10 @@ line : ';' } | '?' T_SYMBOL {print_help(ex_to($2).get_name());} | '?' T_TIME {print_help("time");} + | '?' T_PRINT {print_help("print");} + | '?' T_IPRINT {print_help("iprint");} + | '?' T_PRINTLATEX {print_help("print_latex");} + | '?' T_PRINTCSRC {print_help("print_csrc");} | '?' '?' {print_help_topics();} | T_QUIT {YYACCEPT;} | T_WARRANTY { @@ -198,6 +202,8 @@ line : ';' cout << (syms.size() > 350 ? 350 : syms.size()); cout << " out of a possible 350.\n"; } + | T_REAL_SYMBOLS { symboltype = domain::real; } + | T_COMPLEX_SYMBOLS { symboltype = domain::complex; } | T_TIME {getrusage(RUSAGE_SELF, &start_time);} '(' exp ')' { getrusage(RUSAGE_SELF, &end_time); cout << (end_time.ru_utime.tv_sec - start_time.ru_utime.tv_sec) + @@ -295,6 +301,7 @@ static void push(const ex &e) static ex f_collect(const exprseq &e) {return e[0].collect(e[1]);} static ex f_collect_distributed(const exprseq &e) {return e[0].collect(e[1], true);} static ex f_collect_common_factors(const exprseq &e) {return collect_common_factors(e[0]);} +static ex f_convert_H_to_Li(const exprseq &e) {return convert_H_to_Li(e[0], e[1]);} static ex f_degree(const exprseq &e) {return e[0].degree(e[1]);} static ex f_denom(const exprseq &e) {return e[0].denom();} static ex f_eval1(const exprseq &e) {return e[0].eval();} @@ -322,8 +329,7 @@ static ex f_tcoeff(const exprseq &e) {return e[0].tcoeff(e[1]);} static ex f_charpoly(const exprseq &e) { CHECK_ARG(0, matrix, charpoly); - CHECK_ARG(1, symbol, charpoly); - return ex_to(e[0]).charpoly(ex_to(e[1])); + return ex_to(e[0]).charpoly(e[1]); } static ex f_coeff(const exprseq &e) @@ -334,14 +340,12 @@ static ex f_coeff(const exprseq &e) static ex f_content(const exprseq &e) { - CHECK_ARG(1, symbol, content); - return e[0].content(ex_to(e[1])); + return e[0].content(e[1]); } static ex f_decomp_rational(const exprseq &e) { - CHECK_ARG(1, symbol, decomp_rational); - return decomp_rational(e[0], ex_to(e[1])); + return decomp_rational(e[0], e[1]); } static ex f_determinant(const exprseq &e) @@ -352,9 +356,9 @@ static ex f_determinant(const exprseq &e) static ex f_diag(const exprseq &e) { - unsigned dim = e.nops(); + size_t dim = e.nops(); matrix &m = *new matrix(dim, dim); - for (unsigned i=0; i(e[2])); + return prem(e[0], e[1], e[2]); } static ex f_primpart(const exprseq &e) { - CHECK_ARG(1, symbol, primpart); - return e[0].primpart(ex_to(e[1])); + return e[0].primpart(e[1]); } static ex f_quo(const exprseq &e) { - CHECK_ARG(2, symbol, quo); - return quo(e[0], e[1], ex_to(e[2])); + return quo(e[0], e[1], e[2]); } static ex f_rem(const exprseq &e) { - CHECK_ARG(2, symbol, rem); - return rem(e[0], e[1], ex_to(e[2])); + return rem(e[0], e[1], e[2]); } static ex f_series(const exprseq &e) @@ -482,8 +482,7 @@ static ex f_series(const exprseq &e) static ex f_sprem(const exprseq &e) { - CHECK_ARG(2, symbol, sprem); - return sprem(e[0], e[1], ex_to(e[2])); + return sprem(e[0], e[1], e[2]); } static ex f_sqrfree2(const exprseq &e) @@ -520,8 +519,7 @@ static ex f_unassign(const exprseq &e) static ex f_unit(const exprseq &e) { - CHECK_ARG(1, symbol, unit); - return e[0].unit(ex_to(e[1])); + return e[0].unit(e[1]); } static ex f_dummy(const exprseq &e) @@ -543,6 +541,7 @@ static const fcn_init builtin_fcns[] = { {"collect_common_factors", f_collect_common_factors, 1}, {"collect_distributed", f_collect_distributed, 2}, {"content", f_content, 2}, + {"convert_H_to_Li", f_convert_H_to_Li, 2}, {"decomp_rational", f_decomp_rational, 2}, {"degree", f_degree, 2}, {"denom", f_denom, 1}, @@ -561,6 +560,7 @@ static const fcn_init builtin_fcns[] = { {"gcd", f_gcd, 2}, {"has", f_has, 2}, {"inverse", f_inverse, 1}, + {"iprint", f_dummy, 0}, // for Tab-completion {"is", f_is, 1}, {"lcm", f_lcm, 2}, {"lcoeff", f_lcoeff, 2}, @@ -577,6 +577,9 @@ static const fcn_init builtin_fcns[] = { {"pow", f_pow, 2}, {"prem", f_prem, 3}, {"primpart", f_primpart, 2}, + {"print", f_dummy, 0}, // for Tab-completion + {"print_csrc", f_dummy, 0}, // for Tab-completion + {"print_latex", f_dummy, 0}, // for Tab-completion {"quo", f_quo, 3}, {"rem", f_rem, 3}, {"series", f_series, 3}, @@ -587,12 +590,12 @@ static const fcn_init builtin_fcns[] = { {"subs", f_subs2, 2}, {"subs", f_subs3, 3}, {"tcoeff", f_tcoeff, 2}, - {"time", f_dummy, 0}, + {"time", f_dummy, 0}, // for Tab-completion {"trace", f_trace, 1}, {"transpose", f_transpose, 1}, {"unassign", f_unassign, 1}, {"unit", f_unit, 2}, - {NULL, f_dummy, 0} // End marker + {NULL, f_dummy, 0} // End marker }; struct fcn_help_init { @@ -622,9 +625,12 @@ static const fcn_help_init builtin_help[] = { {"sinh", "hyperbolic sine function"}, {"tan", "tangent function"}, {"tanh", "hyperbolic tangent function"}, - {"zeta", "zeta function\nzeta(x) is Riemann's zeta function, zeta(n,x) its nth derivative"}, + {"zeta", "zeta function\nzeta(x) is Riemann's zeta function, zetaderiv(n,x) its nth derivative.\nIf x is a GiNaC::lst, it is a multiple zeta value\nzeta(x,s) is an alternating Euler sum"}, {"Li2", "dilogarithm"}, {"Li3", "trilogarithm"}, + {"Li", "(multiple) polylogarithm"}, + {"S", "Nielsen's generalized polylogarithm"}, + {"H", "harmonic polylogarithm"}, {"Order", "order term function (for truncated power series)"}, {"Derivative", "inert differential operator"}, {NULL, NULL} // End marker @@ -813,7 +819,7 @@ static char **fcn_completion(const char *text, int start, int end) void greeting(void) { cout << "ginsh - GiNaC Interactive Shell (" << PACKAGE << " V" << VERSION << ")" << endl; - cout << " __, _______ Copyright (C) 1999-2002 Johannes Gutenberg University Mainz,\n" + cout << " __, _______ Copyright (C) 1999-2004 Johannes Gutenberg University Mainz,\n" << " (__) * | Germany. This is free software with ABSOLUTELY NO WARRANTY.\n" << " ._) i N a C | You are welcome to redistribute it under certain conditions.\n" << "<-------------' For details type `warranty;'.\n" << endl; @@ -846,6 +852,12 @@ int main(int argc, char **argv) insert_help(builtin_help); insert_help(extended_help); + // Help for other keywords + insert_help("print", "print(expression) - dumps the internal structure of the given expression (for debugging)"); + insert_help("iprint", "iprint(expression) - prints the given integer expression in decimal, octal, and hexadecimal bases"); + insert_help("print_latex", "print_latex(expression) - prints a LaTeX representation of the given expression"); + insert_help("print_csrc", "print_csrc(expression) - prints a C source code representation of the given expression"); + // Init readline completer rl_readline_name = argv[0]; #if (GINAC_RL_VERSION_MAJOR < 4) || (GINAC_RL_VERSION_MAJOR == 4 && GINAC_RL_VERSION_MINOR < 2)