lemon/polynomial.h
author alpar
Wed, 08 Nov 2006 23:28:14 +0000
changeset 2294 abf880d78522
parent 2199 1229af45cc69
child 2386 81b47fc5c444
permissions -rw-r--r--
Script for automatic checking of SVN commit's consistency
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/* -*- C++ -*-
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 *
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 * This file is a part of LEMON, a generic C++ optimization library
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 *
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 * Copyright (C) 2003-2006
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 * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
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 * (Egervary Research Group on Combinatorial Optimization, EGRES).
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 *
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 * Permission to use, modify and distribute this software is granted
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 * provided that this copyright notice appears in all copies. For
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 * precise terms see the accompanying LICENSE file.
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 *
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 * This software is provided "AS IS" with no warranty of any kind,
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 * express or implied, and with no claim as to its suitability for any
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 * purpose.
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 *
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 */
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#ifndef LEMON_BEZIER_H
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#define LEMON_BEZIER_H
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///\ingroup misc
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///\file
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///\brief A simple class implementing polynomials.
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///
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///\author Alpar Juttner
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#include<vector>
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namespace lemon {
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  /// \addtogroup misc
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  /// @{
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  ///Simple polinomial class
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  ///This class implements a polynomial where the coefficients are of
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  ///type \c T.
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  ///
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  ///The coefficients are stored in an std::vector.
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  template<class T>
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  class Polynomial
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  {
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    std::vector<T> _coeff;
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  public:
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    ///Construct a polynomial of degree \c d.
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    explicit Polynomial(int d=0) : _coeff(d+1) {}
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    ///\e
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    template<class U> Polynomial(const U &u) : _coeff(1,u) {}
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    ///\e
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    template<class U> Polynomial(const Polynomial<U> &u) : _coeff(u.deg()+1)
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    {
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      for(int i=0;i<(int)_coeff.size();i++) _coeff[i]=u[i];
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    }
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    ///Query the degree of the polynomial.
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    ///Query the degree of the polynomial.
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    ///\warning This number differs from real degree of the polinomial if
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    ///the coefficient of highest degree is 0.
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    int deg() const { return _coeff.size()-1; }
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    ///Set the degree of the polynomial.
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    ///Set the degree of the polynomial. In fact it resizes the
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    ///coefficient vector.
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    void deg(int d) { _coeff.resize(d+1);}
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    ///Returns (as a reference) the coefficient of degree \c d.
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    typename std::vector<T>::reference operator[](int d) { return _coeff[d]; }
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    ///Returns (as a const reference) the coefficient of degree \c d.
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    typename std::vector<T>::const_reference
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    operator[](int d) const {return _coeff[d];}
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    ///Substitute the value u into the polinomial.
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    ///Substitute the value u into the polinomial.
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    ///The calculation will be done using type \c R.
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    ///The following examples shows the usage of the template parameter \c R.
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    ///\code
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    ///  Polynomial<dim2::Point<double> > line(1);
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    ///  line[0]=dim2::Point<double>(12,25);
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    ///  line[1]=dim2::Point<double>(2,7);
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    ///  ...
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    ///  dim2::Point<double> d = line.subst<dim2::Point<double> >(23.2);
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    ///\endcode
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    ///
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    ///\code
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    ///  Polynomial<double> p;
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    ///  Polynomial<double> q;
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    ///  ...
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    ///  Polynomial<double> s = p.subst<Polynomial<double> >(q);
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    ///\endcode
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    template<class R,class U>
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    R subst(const U &u) const
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    {
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      typename std::vector<T>::const_reverse_iterator i=_coeff.rbegin();
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      R v=*i;
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      for(++i;i!=_coeff.rend();++i) v=v*u+*i;
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      return v;
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    }
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    ///Substitute the value u into the polinomial.
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    ///Substitute the value u into the polinomial.
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    ///The calculation will be done using type \c T
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    ///(i.e. using the type of the coefficients.)
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    template<class U>
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    T operator()(const U &u) const 
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    {
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      return subst<T>(u);
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    }
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    ///Derivate the polynomial (in place)
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    Polynomial &derivateMyself()
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    {
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      for(int i=1;i<(int)_coeff.size();i++) _coeff[i-1]=i*_coeff[i];
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      _coeff.pop_back();
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      return *this;
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    }
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    ///Return the derivate of the polynomial
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    Polynomial derivate() const
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    {
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      Polynomial tmp(deg()-1);
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      for(int i=1;i<(int)_coeff.size();i++) tmp[i-1]=i*_coeff[i];
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      return tmp;
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    }
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    ///Integrate the polynomial (in place)
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    Polynomial &integrateMyself()
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    {
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      _coeff.push_back(T());
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      for(int i=_coeff.size()-1;i>0;i--) _coeff[i]=_coeff[i-1]/i;
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      _coeff[0]=0;
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      return *this;
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    }
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    ///Return the integrate of the polynomial
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    Polynomial integrate() const
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    {
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      Polynomial tmp(deg()+1);
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      tmp[0]=0;
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      for(int i=0;i<(int)_coeff.size();i++) tmp[i+1]=_coeff[i]/(i+1);
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      return tmp;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator+=(const Polynomial<U> &p)
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    {
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      if(p.deg()>deg()) _coeff.resize(p.deg()+1);
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      for(int i=0;i<=(int)std::min(deg(),p.deg());i++)
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	_coeff[i]+=p[i];
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      return *this;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator-=(const Polynomial<U> &p)
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    {
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      if(p.deg()>deg()) _coeff.resize(p.deg()+1);
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      for(int i=0;i<=std::min(deg(),p.deg());i++) _coeff[i]-=p[i];
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      return *this;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator+=(const U &u)
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    {
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      _coeff[0]+=u;
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      return *this;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator-=(const U &u)
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    {
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      _coeff[0]+=u;
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      return *this;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator*=(const U &u)
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    {
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      for(typename std::vector<T>::iterator i=_coeff.begin();i!=_coeff.end();++i)
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	*i*=u;
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      return *this;
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    }
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    ///\e
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    template<class U>
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    Polynomial &operator/=(const U &u)
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    {
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      for(typename std::vector<T>::iterator i=_coeff.begin();i!=_coeff.end();++i)
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	*i/=u;
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      return *this;
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    }
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  };
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  ///Equality comparison
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  ///\relates Polynomial
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  ///\warning Two polynomials are defined to be unequal if their degrees differ,
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  ///even if the non-zero coefficients are the same.
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  template<class U,class V>
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  bool operator==(const Polynomial<U> &u,const Polynomial<V> &v)
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  {
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    if(u.deg()!=v.deg()) return false;
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    for(int i=0;i<=u.deg();i++) if(u[i]!=v[i]) return false;
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    return true;
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  }
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  ///Non-equality comparison
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  ///\relates Polynomial
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  ///\warning Two polynomials are defined to be unequal if their degrees differ,
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  ///even if the non-zero coefficients are the same.
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  template<class U,class V>
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  bool operator!=(const Polynomial<U> &u,const Polynomial<V> &v)
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  {
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    return !(u==v);
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator+(const Polynomial<U> &u,const Polynomial<V> &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp+=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator-(const Polynomial<U> &u,const Polynomial<V> &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp-=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator*(const Polynomial<U> &u,const Polynomial<V> &v)
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  {
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    Polynomial<U> tmp(u.deg()+v.deg());
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    for(int i=0;i<=v.deg();i++)
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      for(int j=0;j<=u.deg();j++)
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	tmp[i+j]+=v[i]*u[j];
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator+(const Polynomial<U> &u,const V &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp+=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator+(const V &v,const Polynomial<U> &u)
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  {
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    Polynomial<U> tmp=u;
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    tmp+=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator-(const Polynomial<U> &u,const V &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp-=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U>
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  Polynomial<U> operator-(const Polynomial<U> &u)
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  {
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    Polynomial<U> tmp(u.deg());
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    for(int i=0;i<=u.deg();i++) tmp[i]=-u[i];
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator-(const V &v,const Polynomial<U> &u)
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  {
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    Polynomial<U> tmp=-u;
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    tmp+=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator*(const Polynomial<U> &u,const V &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp*=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator*(const V &v,const Polynomial<U> &u)
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  {
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    Polynomial<U> tmp=u;
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    tmp*=v;
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    return tmp;
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  }
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  ///\e
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  ///\relates Polynomial
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  ///
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  template<class U,class V>
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  Polynomial<U> operator/(const Polynomial<U> &u,const V &v)
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  {
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    Polynomial<U> tmp=u;
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    tmp/=v;
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    return tmp;
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  }
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  /// @}
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} //END OF NAMESPACE LEMON
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#endif // LEMON_POLYNOMIAL_H