X-Git-Url: https://ginac.de/ginac.git//ginac.git?a=blobdiff_plain;ds=sidebyside;f=ginac%2Fmatrix.h;h=b1ee32814b926f15d4a90b6387770394d01214ae;hb=3ea59519b3fa572a2aba7b8540b336dcb2924262;hp=6081e900257131db359b0f40fc89e0b9a9e6b19e;hpb=d5b86dd10dd9cba12175d07af0b6edfc9a215e36;p=ginac.git diff --git a/ginac/matrix.h b/ginac/matrix.h index 6081e900..b1ee3281 100644 --- a/ginac/matrix.h +++ b/ginac/matrix.h @@ -3,7 +3,7 @@ * Interface to symbolic matrices */ /* - * GiNaC Copyright (C) 1999-2015 Johannes Gutenberg University Mainz, Germany + * GiNaC Copyright (C) 1999-2019 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 @@ -26,6 +26,7 @@ #include "basic.h" #include "ex.h" #include "archive.h" +#include "compiler.h" #include #include @@ -99,15 +100,9 @@ class matrix : public basic public: matrix(unsigned r, unsigned c); matrix(unsigned r, unsigned c, const lst & l); + matrix(std::initializer_list> l); - // First step of initialization of matrix with a comma-separated sequence - // of expressions. Subsequent steps are handled by matrix_init<>::operator,(). - matrix_init operator=(const ex & x) - { - m[0] = x; - return matrix_init(++m.begin()); - } - + matrix_init operator=(const ex & x) attribute_deprecated; protected: matrix(unsigned r, unsigned c, const exvector & m2); matrix(unsigned r, unsigned c, exvector && m2); @@ -116,7 +111,6 @@ public: size_t nops() const override; ex op(size_t i) const override; ex & let_op(size_t i) override; - ex eval(int level=0) const override; ex evalm() const override {return *this;} ex subs(const exmap & m, unsigned options = 0) const override; ex eval_indexed(const basic & i) const override; @@ -155,15 +149,19 @@ public: ex trace() const; ex charpoly(const ex & lambda) const; matrix inverse() const; + matrix inverse(unsigned algo) const; matrix solve(const matrix & vars, const matrix & rhs, unsigned algo = solve_algo::automatic) const; unsigned rank() const; + unsigned rank(unsigned solve_algo) const; bool is_zero_matrix() const; protected: ex determinant_minor() const; + std::vector echelon_form(unsigned algo, int n); int gauss_elimination(const bool det = false); int division_free_elimination(const bool det = false); int fraction_free_elimination(const bool det = false); + std::vector markowitz_elimination(unsigned n); int pivot(unsigned ro, unsigned co, bool symbolic = true); void print_elements(const print_context & c, const char *row_start, const char *row_end, const char *row_sep, const char *col_sep) const; @@ -179,6 +177,13 @@ protected: }; GINAC_DECLARE_UNARCHIVER(matrix); +// First step of initialization of matrix with a comma-separated sequence +// of expressions. Subsequent steps are handled by matrix_init<>::operator,(). +inline matrix_init matrix::operator=(const ex & x) +{ + m[0] = x; + return matrix_init(++m.begin()); +} // wrapper functions around member functions @@ -188,11 +193,8 @@ inline size_t nops(const matrix & m) inline ex expand(const matrix & m, unsigned options = 0) { return m.expand(options); } -inline ex eval(const matrix & m, int level = 0) -{ return m.eval(level); } - -inline ex evalf(const matrix & m, int level = 0) -{ return m.evalf(level); } +inline ex evalf(const matrix & m) +{ return m.evalf(); } inline unsigned rows(const matrix & m) { return m.rows(); } @@ -213,10 +215,14 @@ inline ex charpoly(const matrix & m, const ex & lambda) { return m.charpoly(lambda); } inline matrix inverse(const matrix & m) -{ return m.inverse(); } +{ return m.inverse(solve_algo::automatic); } +inline matrix inverse(const matrix & m, unsigned algo) +{ return m.inverse(algo); } inline unsigned rank(const matrix & m) { return m.rank(); } +inline unsigned rank(const matrix & m, unsigned solve_algo) +{ return m.rank(solve_algo); } // utility functions @@ -225,6 +231,7 @@ extern ex lst_to_matrix(const lst & l); /** Convert list of diagonal elements to matrix. */ extern ex diag_matrix(const lst & l); +extern ex diag_matrix(std::initializer_list l); /** Create an r times c unit matrix. */ extern ex unit_matrix(unsigned r, unsigned c);