// Copyright (c) 2002,2003 Utrecht University (The Netherlands), // ETH Zurich (Switzerland), Freie Universitaet Berlin (Germany), // INRIA Sophia-Antipolis (France), Martin-Luther-University Halle-Wittenberg // (Germany), Max-Planck-Institute Saarbruecken (Germany), RISC Linz (Austria), // and Tel-Aviv University (Israel). All rights reserved. // // This file is part of CGAL (www.cgal.org); you can redistribute it and/or // modify it under the terms of the GNU Lesser General Public License as // published by the Free Software Foundation; version 2.1 of the License. // See the file LICENSE.LGPL distributed with CGAL. // // Licensees holding a valid commercial license may use this file in // accordance with the commercial license agreement provided with the software. // // This file is provided AS IS with NO WARRANTY OF ANY KIND, INCLUDING THE // WARRANTY OF DESIGN, MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE. // // $Source: /CVSROOT/CGAL/Packages/Number_types/include/CGAL/gmpxx.h,v $ // $Revision: 1.20 $ $Date: 2004/09/02 15:34:44 $ // $Name: $ // // Author(s) : Sylvain Pion #ifndef CGAL_GMPXX_H #define CGAL_GMPXX_H #include #include #include #include #include #include // This file gathers the necessary adaptors so that the following // C++ number types that come with GMP can be used by CGAL : // - mpz_class // - mpq_class // - mpf_class support is commented out until to_interval() is implemented. // It is probably not very useful with CGAL anyway. // Note that GMP++ use the expression template mechanism, which makes things // a little bit complicated in order to make square(x+y) work for example. // Reading gmpxx.h shows that ::__gmp_expr is the mp[zqf]_class proper, // while ::__gmp_expr is the others "expressions". CGAL_BEGIN_NAMESPACE template <> struct Number_type_traits { typedef Tag_false Has_gcd; typedef Tag_true Has_division; typedef Tag_true Has_sqrt; typedef Tag_true Has_exact_ring_operations; typedef Tag_false Has_exact_division; typedef Tag_false Has_exact_sqrt; }; template <> struct Number_type_traits { typedef Tag_false Has_gcd; typedef Tag_true Has_division; typedef Tag_false Has_sqrt; typedef Tag_true Has_exact_ring_operations; typedef Tag_true Has_exact_division; typedef Tag_false Has_exact_sqrt; }; template <> struct Rational_traits { typedef mpz_class RT; RT numerator (const mpq_class & r) const { return r.get_num(); } RT denominator (const mpq_class & r) const { return r.get_den(); } mpq_class make_rational(const RT & n, const RT & d) const { return mpq_class(n, d); } }; template < typename T, typename U > inline ::__gmp_expr sqrt(const ::__gmp_expr &e) { return ::sqrt(e); } template < typename T, typename U > inline double to_double(const ::__gmp_expr & e) { return ::__gmp_expr(e).get_d(); } template < typename T, typename U > inline bool is_finite(const ::__gmp_expr &) { return true; } template < typename T, typename U > inline bool is_valid(const ::__gmp_expr &) { return true; } template < typename T, typename U > inline io_Operator io_tag(const ::__gmp_expr &) { return io_Operator(); } template < typename T, typename U > std::pair to_interval (const ::__gmp_expr & z) { // Calls the functions below after dealing with the expression template. return to_interval(::__gmp_expr(z)); } inline std::pair to_interval (const mpz_class & z) { mpfr_t x; mpfr_init2 (x, 53); /* Assume IEEE-754 */ mpfr_set_z (x, z.get_mpz_t(), GMP_RNDD); double i = mpfr_get_d (x, GMP_RNDD); /* EXACT but can overflow */ mpfr_set_z (x, z.get_mpz_t(), GMP_RNDU); double s = mpfr_get_d (x, GMP_RNDU); /* EXACT but can overflow */ mpfr_clear (x); return std::pair(i, s); } inline std::pair to_interval (const mpq_class & q) { mpfr_t x; mpfr_init2 (x, 53); /* Assume IEEE-754 */ mpfr_set_q (x, q.get_mpq_t(), GMP_RNDD); double i = mpfr_get_d (x, GMP_RNDD); /* EXACT but can overflow */ mpfr_set_q (x, q.get_mpq_t(), GMP_RNDU); double s = mpfr_get_d (x, GMP_RNDU); /* EXACT but can overflow */ mpfr_clear (x); return std::pair(i, s); } // These are necessary due to expression-templates. template < typename T, typename U > inline ::__gmp_expr abs(const ::__gmp_expr& x) { return ::abs(x); } template < typename T, typename U > inline ::__gmp_expr square(const ::__gmp_expr& x) { return x*x; } template < typename T, typename U > inline Sign sign(const ::__gmp_expr & e) { return (Sign) ::sgn(e); } template < typename T, typename U1, typename U2 > inline Comparison_result compare(const ::__gmp_expr & e1, const ::__gmp_expr & e2) { // cmp returns any int value, not just -1/0/1... return (Comparison_result) CGAL_NTS sign(::cmp(e1, e2)); } template < typename T, typename U > inline bool is_zero(const ::__gmp_expr & e) { return ::sgn(e) == 0; } template < typename T, typename U > inline bool is_one(const ::__gmp_expr & e) { return e == 1; } template < typename T, typename U > inline bool is_positive(const ::__gmp_expr & e) { return ::sgn(e) > 0; } template < typename T, typename U > inline bool is_negative(const ::__gmp_expr & e) { return ::sgn(e) < 0; } CGAL_END_NAMESPACE #endif // CGAL_GMPXX_H