construct_filtered_function.h

来自「很多二维 三维几何计算算法 C++ 类库」· C头文件 代码 · 共 106 行

// Copyright (c) 2005  Stanford University (USA).
// 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.
//
// $URL: svn+ssh://scm.gforge.inria.fr/svn/cgal/branches/CGAL-3.3-branch/Kinetic_data_structures/include/CGAL/Polynomial/internal/Filtered_rational/Construct_filtered_function.h $
// $Id: Construct_filtered_function.h 28567 2006-02-16 14:30:13Z lsaboret $
// 
//
// Author(s)     : Daniel Russel <drussel@alumni.princeton.edu>

#ifndef CGAL_POLYNOMIAL_INTERNAL_CONSTRUCT_FILTERED_FUNCTION_H
#define CGAL_POLYNOMIAL_INTERNAL_CONSTRUCT_FILTERED_FUNCTION_H
#include <CGAL/Polynomial/basic.h>
#include <CGAL/Polynomial/internal/Rational/Construct_function.h>

CGAL_POLYNOMIAL_BEGIN_INTERNAL_NAMESPACE

template <class Fn>
struct Construct_filtered_function
{

    Construct_filtered_function(const typename Fn::Interval_function_converter &){}

    typedef typename Fn::Exact_function EF;
    typedef Construct_function<EF> Construct_exact_function;

    typedef Fn result_type;
    typedef typename result_type::NT argument_type;

//! construct high degree polynomials
    result_type operator()(const argument_type &a0,
        const argument_type &a1=0) const
    {
        Construct_exact_function cef;
        return result_type(cef(a0, a1));
    }

//! construct high degree polynomials
    result_type operator()(const argument_type &a0,
        const argument_type &a1,
        const argument_type &a2,
        const argument_type &a3=0) const
    {
        Construct_exact_function cef;
        return result_type(cef(a0, a1, a2, a3));
    }

//! construct high degree polynomials
    result_type operator()(const argument_type &a0,
        const argument_type &a1,
        const argument_type &a2,
        const argument_type &a3,
        const argument_type &a4,
        const argument_type &a5=0,
        const argument_type &a6=0,
        const argument_type &a7=0) const
    {
        Construct_exact_function cef;
        return result_type(cef(a0, a1, a2, a3,
            a4, a5, a6, a7));
    }

//! construct high degree polynomials
    result_type operator()(const argument_type &a0,
        const argument_type &a1,
        const argument_type &a2,
        const argument_type &a3,
        const argument_type &a4,
        const argument_type &a5,
        const argument_type &a6,
        const argument_type &a7,
        const argument_type &a8,
        const argument_type &a9=0,
        const argument_type &a10=0,
        const argument_type &a11=0,
        const argument_type &a12=0,
        const argument_type &a13=0,
        const argument_type &a14=0,
        const argument_type &a15=0,
        const argument_type &a16=0,
        const argument_type &a17=0,
        const argument_type &a18=0,
        const argument_type &a19=0) const
    {
        Construct_exact_function cef;
        return result_type(cef(a0, a1, a2, a3,
            a4, a5, a6, a7,
            a8, a9, a10, a11,
            a12, a13, a14, a15,
            a16, a17, a18, a19));
    }
};

CGAL_POLYNOMIAL_END_INTERNAL_NAMESPACE
#endif