X-Git-Url: https://www.ginac.de/ginac.git//ginac.git?p=ginac.git;a=blobdiff_plain;f=ginac%2Ffderivative.cpp;h=5eae9f42ba7d3638df8787f6bb96458c24c258ce;hp=ae73eb489421f524bb0ed5c2d8928620a7d29438;hb=9197695fc88502b6a56c7270e824f73faa7749f9;hpb=1602530f716ba1d425a0667b897182b99c374823 diff --git a/ginac/fderivative.cpp b/ginac/fderivative.cpp index ae73eb48..5eae9f42 100644 --- a/ginac/fderivative.cpp +++ b/ginac/fderivative.cpp @@ -3,7 +3,7 @@ * Implementation of abstract derivatives of functions. */ /* - * GiNaC Copyright (C) 1999-2009 Johannes Gutenberg University Mainz, Germany + * GiNaC Copyright (C) 1999-2021 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 @@ -31,6 +31,7 @@ namespace GiNaC { GINAC_IMPLEMENT_REGISTERED_CLASS_OPT(fderivative, function, print_func(&fderivative::do_print). + print_func(&fderivative::do_print_latex). print_func(&fderivative::do_print_csrc). print_func(&fderivative::do_print_tree)) @@ -55,7 +56,7 @@ fderivative::fderivative(unsigned ser, const paramset & params, const exvector & { } -fderivative::fderivative(unsigned ser, const paramset & params, std::auto_ptr vp) : function(ser, vp), parameter_set(params) +fderivative::fderivative(unsigned ser, const paramset & params, exvector && v) : function(ser, std::move(v)), parameter_set(params) { } @@ -81,7 +82,7 @@ GINAC_BIND_UNARCHIVER(fderivative); void fderivative::archive(archive_node &n) const { inherited::archive(n); - paramset::const_iterator i = parameter_set.begin(), end = parameter_set.end(); + auto i = parameter_set.begin(), end = parameter_set.end(); while (i != end) { n.add_unsigned("param", *i); ++i; @@ -102,7 +103,7 @@ void fderivative::print(const print_context & c, unsigned level) const void fderivative::do_print(const print_context & c, unsigned level) const { c.s << "D["; - paramset::const_iterator i = parameter_set.begin(), end = parameter_set.end(); + auto i = parameter_set.begin(), end = parameter_set.end(); --end; while (i != end) { c.s << *i++ << ","; @@ -111,10 +112,27 @@ void fderivative::do_print(const print_context & c, unsigned level) const printseq(c, '(', ',', ')', exprseq::precedence(), function::precedence()); } +void fderivative::do_print_latex(const print_context & c, unsigned level) const +{ + int order=1; + c.s << "\\partial_{"; + auto i = parameter_set.begin(), end = parameter_set.end(); + --end; + while (i != end) { + ++order; + c.s << *i++ << ","; + } + c.s << *i << "}"; + if (order>1) + c.s << "^{" << order << "}"; + c.s << "(" << registered_functions()[serial].TeX_name << ")"; + printseq(c, '(', ',', ')', exprseq::precedence(), function::precedence()); +} + void fderivative::do_print_csrc(const print_csrc & c, unsigned level) const { c.s << "D_"; - paramset::const_iterator i = parameter_set.begin(), end = parameter_set.end(); + auto i = parameter_set.begin(), end = parameter_set.end(); --end; while (i != end) c.s << *i++ << "_"; @@ -129,23 +147,18 @@ void fderivative::do_print_tree(const print_tree & c, unsigned level) const << std::hex << ", hash=0x" << hashvalue << ", flags=0x" << flags << std::dec << ", nops=" << nops() << ", params="; - paramset::const_iterator i = parameter_set.begin(), end = parameter_set.end(); + auto i = parameter_set.begin(), end = parameter_set.end(); --end; while (i != end) c.s << *i++ << ","; c.s << *i << std::endl; - for (size_t i=0; i 1) { - // first evaluate children, then we will end up here again - return fderivative(serial, parameter_set, evalchildren(level)); - } - // No parameters specified? Then return the function itself if (parameter_set.empty()) return function(serial, seq); @@ -157,13 +170,6 @@ ex fderivative::eval(int level) const return this->hold(); } -/** Numeric evaluation falls back to evaluation of arguments. - * @see basic::evalf */ -ex fderivative::evalf(int level) const -{ - return basic::evalf(level); -} - /** The series expansion of derivatives falls back to Taylor expansion. * @see basic::series */ ex fderivative::series(const relational & r, int order, unsigned options) const @@ -176,9 +182,9 @@ ex fderivative::thiscontainer(const exvector & v) const return fderivative(serial, parameter_set, v); } -ex fderivative::thiscontainer(std::auto_ptr vp) const +ex fderivative::thiscontainer(exvector && v) const { - return fderivative(serial, parameter_set, vp); + return fderivative(serial, parameter_set, std::move(v)); } /** Implementation of ex::diff() for derivatives. It applies the chain rule. @@ -227,4 +233,20 @@ bool fderivative::match_same_type(const basic & other) const return parameter_set == o.parameter_set && inherited::match_same_type(other); } +/** Expose this object's derivative structure. + * + * Parameter numbers occurring more than once stand for repeated + * differentiation with respect to that parameter. If a symbolic function + * f(x,y) is differentiated with respect to x, this method will return {0}. + * If f(x,y) is differentiated twice with respect to y, it will return {1,1}. + * (This corresponds to the way this object is printed.) + * + * @return multiset of function's parameter numbers that are abstractly + * differentiated. */ +const paramset& fderivative::derivatives() const +{ + return parameter_set; +} + + } // namespace GiNaC