/* -*- C++ -*-

  * lemon/lp_base.h - Part of LEMON, a generic C++ optimization library

  *

  * Copyright (C) 2005 Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport

  * (Egervary Research Group on Combinatorial Optimization, EGRES).

  *

  * Permission to use, modify and distribute this software is granted

  * provided that this copyright notice appears in all copies. For

  * precise terms see the accompanying LICENSE file.

  *

  * This software is provided "AS IS" with no warranty of any kind,

  * express or implied, and with no claim as to its suitability for any

  * purpose.

  *

  */

 #ifndef LEMON_LP_BASE_H

 #define LEMON_LP_BASE_H

 #include<vector>

 #include<map>

 #include<limits>

 #include<cmath>

 #include<lemon/utility.h>

 #include<lemon/error.h>

 #include<lemon/invalid.h>

 ///\file

 ///\brief The interface of the LP solver interface.

 ///\ingroup gen_opt_group

 namespace lemon {

   ///Internal data structure to convert floating id's to fix one's

   ///\todo This might be implemented to be also usable in other places.

   class _FixId 

   {

   protected:

     std::vector<int> index;

     std::vector<int> cross;

     int first_free;

   public:

     _FixId() : first_free(-1) {};

     ///Convert a floating id to a fix one

     ///\param n is a floating id

     ///\return the corresponding fix id

     int fixId(int n) const {return cross[n];}

     ///Convert a fix id to a floating one

     ///\param n is a fix id

     ///\return the corresponding floating id

     int floatingId(int n) const { return index[n];}

     ///Add a new floating id.

     ///\param n is a floating id

     ///\return the fix id of the new value

     ///\todo Multiple additions should also be handled.

     int insert(int n)

     {

       if(n>=int(cross.size())) {

 	cross.resize(n+1);

 	if(first_free==-1) {

 	  cross[n]=index.size();

 	  index.push_back(n);

 	}

 	else {

 	  cross[n]=first_free;

 	  int next=index[first_free];

 	  index[first_free]=n;

 	  first_free=next;

 	}

 	return cross[n];

       }

       ///\todo Create an own exception type.

       else throw LogicError(); //floatingId-s must form a continuous range;

     }

     ///Remove a fix id.

     ///\param n is a fix id

     ///

     void erase(int n) 

     {

       int fl=index[n];

       index[n]=first_free;

       first_free=n;

       for(int i=fl+1;i<int(cross.size());++i) {

 	cross[i-1]=cross[i];

 	index[cross[i]]--;

       }

       cross.pop_back();

     }

     ///An upper bound on the largest fix id.

     ///\todo Do we need this?

     ///

     std::size_t maxFixId() { return cross.size()-1; }

   };

   ///Common base class for LP solvers

   ///\todo Much more docs

   ///\ingroup gen_opt_group

   class LpSolverBase {

   public:

     ///Possible outcomes of an LP solving procedure

     enum SolveExitStatus {

       ///This means that the problem has been successfully solved: either

       ///an optimal solution has been found or infeasibility/unboundedness

       ///has been proved.

       SOLVED = 0,

       ///Any other case (including the case when some user specified limit has been exceeded)

       UNSOLVED = 1

     };

       ///\e

     enum SolutionStatus {

       ///Feasible solution has'n been found (but may exist).

       ///\todo NOTFOUND might be a better name.

       ///

       UNDEFINED = 0,

       ///The problem has no feasible solution

       INFEASIBLE = 1,

       ///Feasible solution found

       FEASIBLE = 2,

       ///Optimal solution exists and found

       OPTIMAL = 3,

       ///The cost function is unbounded

       ///\todo Give a feasible solution and an infinite ray (and the

       ///corresponding bases)

       INFINITE = 4

     };

     ///\e The type of the investigated LP problem

     enum ProblemTypes {

       ///Primal-dual feasible

       PRIMAL_DUAL_FEASIBLE = 0,

       ///Primal feasible dual infeasible

       PRIMAL_FEASIBLE_DUAL_INFEASIBLE = 1,

       ///Primal infeasible dual feasible

       PRIMAL_INFEASIBLE_DUAL_FEASIBLE = 2,

       ///Primal-dual infeasible

       PRIMAL_DUAL_INFEASIBLE = 3,

       ///Could not determine so far

       UNKNOWN = 4

     };

     ///The floating point type used by the solver

     typedef double Value;

     ///The infinity constant

     static const Value INF;

     ///The not a number constant

     static const Value NaN;

     ///Refer to a column of the LP.

     ///This type is used to refer to a column of the LP.

     ///

     ///Its value remains valid and correct even after the addition or erase of

     ///other columns.

     ///

     ///\todo Document what can one do with a Col (INVALID, comparing,

     ///it is similar to Node/Edge)

     class Col {

     protected:

       int id;

       friend class LpSolverBase;

     public:

       typedef Value ExprValue;

       typedef True LpSolverCol;

       Col() {}

       Col(const Invalid&) : id(-1) {}

       bool operator<(Col c) const  {return id<c.id;}

       bool operator==(Col c) const  {return id==c.id;}

       bool operator!=(Col c) const  {return id==c.id;}

     };

     ///Refer to a row of the LP.

     ///This type is used to refer to a row of the LP.

     ///

     ///Its value remains valid and correct even after the addition or erase of

     ///other rows.

     ///

     ///\todo Document what can one do with a Row (INVALID, comparing,

     ///it is similar to Node/Edge)

     class Row {

     protected:

       int id;

       friend class LpSolverBase;

     public:

       typedef Value ExprValue;

       typedef True LpSolverRow;

       Row() {}

       Row(const Invalid&) : id(-1) {}

       bool operator<(Row c) const  {return id<c.id;}

       bool operator==(Row c) const  {return id==c.id;}

       bool operator!=(Row c) const  {return id==c.id;} 

    };

     ///Linear expression of variables and a constant component

     ///This data structure strores a linear expression of the variables

     ///(\ref Col "Col"s) and also has a constant component.

     ///

     ///There are several ways to access and modify the contents of this

     ///container.

     ///- Its it fully compatible with \c std::map<Col,double>, so for expamle

     ///if \c e is an Expr and \c v and \c w are of type \ref Col, then you can

     ///read and modify the coefficients like

     ///these.

     ///\code

     ///e[v]=5;

     ///e[v]+=12;

     ///e.erase(v);

     ///\endcode

     ///or you can also iterate through its elements.

     ///\code

     ///double s=0;

     ///for(LpSolverBase::Expr::iterator i=e.begin();i!=e.end();++i)

     ///  s+=i->second;

     ///\endcode

     ///(This code computes the sum of all coefficients).

     ///- Numbers (<tt>double</tt>'s)

     ///and variables (\ref Col "Col"s) directly convert to an

     ///\ref Expr and the usual linear operations are defined so  

     ///\code

     ///v+w

     ///2*v-3.12*(v-w/2)+2

     ///v*2.1+(3*v+(v*12+w+6)*3)/2

     ///\endcode

     ///are valid \ref Expr "Expr"essions.

     ///The usual assignment operations are also defined.

     ///\code

     ///e=v+w;

     ///e+=2*v-3.12*(v-w/2)+2;

     ///e*=3.4;

     ///e/=5;

     ///\endcode

     ///- The constant member can be set and read by \ref constComp()

     ///\code

     ///e.constComp()=12;

     ///double c=e.constComp();

     ///\endcode

     ///

     ///\note \ref clear() not only sets all coefficients to 0 but also

     ///clears the constant components.

     ///

     ///\sa Constr

     ///

     class Expr : public std::map<Col,Value>

     {

     public:

       typedef LpSolverBase::Col Key; 

       typedef LpSolverBase::Value Value;

     protected:

       typedef std::map<Col,Value> Base;

       Value const_comp;

   public:

       typedef True IsLinExpression;

       ///\e

       Expr() : Base(), const_comp(0) { }

       ///\e

       Expr(const Key &v) : const_comp(0) {

 	Base::insert(std::make_pair(v, 1));

       }

       ///\e

       Expr(const Value &v) : const_comp(v) {}

       ///\e

       void set(const Key &v,const Value &c) {

 	Base::insert(std::make_pair(v, c));

       }

       ///\e

       Value &constComp() { return const_comp; }

       ///\e

       const Value &constComp() const { return const_comp; }

       ///Removes the components with zero coefficient.

       void simplify() {

 	for (Base::iterator i=Base::begin(); i!=Base::end();) {

 	  Base::iterator j=i;

 	  ++j;

 	  if ((*i).second==0) Base::erase(i);

 	  j=i;

 	}

       }

       ///Removes the coefficients closer to zero than \c tolerance.

       void simplify(double &tolerance) {

 	for (Base::iterator i=Base::begin(); i!=Base::end();) {

 	  Base::iterator j=i;

 	  ++j;

 	  if (std::fabs((*i).second)<tolerance) Base::erase(i);

 	  j=i;

 	}

       }

       ///Sets all coefficients and the constant component to 0.

       void clear() {

 	Base::clear();

 	const_comp=0;

       }

       ///\e

       Expr &operator+=(const Expr &e) {

 	for (Base::const_iterator j=e.begin(); j!=e.end(); ++j)

 	  (*this)[j->first]+=j->second;

 	const_comp+=e.const_comp;

 	return *this;

       }

       ///\e

       Expr &operator-=(const Expr &e) {

 	for (Base::const_iterator j=e.begin(); j!=e.end(); ++j)

 	  (*this)[j->first]-=j->second;

 	const_comp-=e.const_comp;

 	return *this;

       }

       ///\e

       Expr &operator*=(const Value &c) {

 	for (Base::iterator j=Base::begin(); j!=Base::end(); ++j)

 	  j->second*=c;

 	const_comp*=c;

 	return *this;

       }

       ///\e

       Expr &operator/=(const Value &c) {

 	for (Base::iterator j=Base::begin(); j!=Base::end(); ++j)

 	  j->second/=c;

 	const_comp/=c;

 	return *this;

       }

     };

     ///Linear constraint

     ///This data stucture represents a linear constraint in the LP.

     ///Basically it is a linear expression with a lower or an upper bound

     ///(or both). These parts of the constraint can be obtained by the member

     ///functions \ref expr(), \ref lowerBound() and \ref upperBound(),

     ///respectively.

     ///There are two ways to construct a constraint.

     ///- You can set the linear expression and the bounds directly

     ///  by the functions above.

     ///- The operators <tt>\<=</tt>, <tt>==</tt> and  <tt>\>=</tt>

     ///  are defined between expressions, or even between constraints whenever

     ///  it makes sense. Therefore if \c e and \c f are linear expressions and

     ///  \c s and \c t are numbers, then the followings are valid expressions

     ///  and thus they can be used directly e.g. in \ref addRow() whenever

     ///  it makes sense.

     ///  \code

     ///  e<=s

     ///  e<=f

     ///  s<=e<=t

     ///  e>=t

     ///  \endcode

     ///\warning The validity of a constraint is checked only at run time, so

     ///e.g. \ref addRow(<tt>x[1]\<=x[2]<=5</tt>) will compile, but will throw a

     ///\ref LogicError exception.

     class Constr

     {

     public:

       typedef LpSolverBase::Expr Expr;

       typedef Expr::Key Key;

       typedef Expr::Value Value;

 //       static const Value INF;

 //       static const Value NaN;

     protected:

       Expr _expr;

       Value _lb,_ub;

     public:

       ///\e

       Constr() : _expr(), _lb(NaN), _ub(NaN) {}

       ///\e

       Constr(Value lb,const Expr &e,Value ub) :

 	_expr(e), _lb(lb), _ub(ub) {}

       ///\e

       Constr(const Expr &e,Value ub) : 

 	_expr(e), _lb(NaN), _ub(ub) {}

       ///\e

       Constr(Value lb,const Expr &e) :

 	_expr(e), _lb(lb), _ub(NaN) {}

       ///\e

       Constr(const Expr &e) : 

 	_expr(e), _lb(NaN), _ub(NaN) {}

       ///\e

       void clear() 

       {

 	_expr.clear();

 	_lb=_ub=NaN;

       }

       ///Reference to the linear expression 

       Expr &expr() { return _expr; }

       ///Cont reference to the linear expression 

       const Expr &expr() const { return _expr; }

       ///Reference to the lower bound.

       ///\return

       ///- \ref INF "INF": the constraint is lower unbounded.

       ///- \ref NaN "NaN": lower bound has not been set.

       ///- finite number: the lower bound

       Value &lowerBound() { return _lb; }

       ///The const version of \ref lowerBound()

       const Value &lowerBound() const { return _lb; }

       ///Reference to the upper bound.

       ///\return

       ///- \ref INF "INF": the constraint is upper unbounded.

       ///- \ref NaN "NaN": upper bound has not been set.

       ///- finite number: the upper bound

       Value &upperBound() { return _ub; }

       ///The const version of \ref upperBound()

       const Value &upperBound() const { return _ub; }

       ///Is the constraint lower bounded?

       bool lowerBounded() const { 

 	using namespace std;

 	return finite(_lb);

       }

       ///Is the constraint upper bounded?

       bool upperBounded() const {

 	using namespace std;

 	return finite(_ub);

       }

     };

     ///Linear expression of rows

     ///This data structure represents a column of the matrix,

     ///thas is it strores a linear expression of the dual variables

     ///(\ref Row "Row"s).

     ///

     ///There are several ways to access and modify the contents of this

     ///container.

     ///- Its it fully compatible with \c std::map<Row,double>, so for expamle

     ///if \c e is an DualExpr and \c v

     ///and \c w are of type \ref Row, then you can

     ///read and modify the coefficients like

     ///these.

     ///\code

     ///e[v]=5;

     ///e[v]+=12;

     ///e.erase(v);

     ///\endcode

     ///or you can also iterate through its elements.

     ///\code

     ///double s=0;

     ///for(LpSolverBase::DualExpr::iterator i=e.begin();i!=e.end();++i)

     ///  s+=i->second;

     ///\endcode

     ///(This code computes the sum of all coefficients).

     ///- Numbers (<tt>double</tt>'s)

     ///and variables (\ref Row "Row"s) directly convert to an

     ///\ref DualExpr and the usual linear operations are defined so  

     ///\code

     ///v+w

     ///2*v-3.12*(v-w/2)

     ///v*2.1+(3*v+(v*12+w)*3)/2

     ///\endcode

     ///are valid \ref DualExpr "DualExpr"essions.

     ///The usual assignment operations are also defined.

     ///\code

     ///e=v+w;

     ///e+=2*v-3.12*(v-w/2);

     ///e*=3.4;

     ///e/=5;

     ///\endcode

     ///

     ///\sa Expr

     ///

     class DualExpr : public std::map<Row,Value>

     {

     public:

       typedef LpSolverBase::Row Key; 

       typedef LpSolverBase::Value Value;

     protected:

       typedef std::map<Row,Value> Base;

     public:

       typedef True IsLinExpression;

       ///\e

       DualExpr() : Base() { }

       ///\e

       DualExpr(const Key &v) {

 	Base::insert(std::make_pair(v, 1));

       }

       ///\e

       void set(const Key &v,const Value &c) {

 	Base::insert(std::make_pair(v, c));

       }

       ///Removes the components with zero coefficient.

       void simplify() {

 	for (Base::iterator i=Base::begin(); i!=Base::end();) {

 	  Base::iterator j=i;

 	  ++j;

 	  if ((*i).second==0) Base::erase(i);

 	  j=i;

 	}

       }

       ///Removes the coefficients closer to zero than \c tolerance.

       void simplify(double &tolerance) {

 	for (Base::iterator i=Base::begin(); i!=Base::end();) {

 	  Base::iterator j=i;

 	  ++j;

 	  if (std::fabs((*i).second)<tolerance) Base::erase(i);

 	  j=i;

 	}

       }

       ///Sets all coefficients to 0.

       void clear() {

 	Base::clear();

       }

       ///\e

       DualExpr &operator+=(const DualExpr &e) {

 	for (Base::const_iterator j=e.begin(); j!=e.end(); ++j)

 	  (*this)[j->first]+=j->second;

 	return *this;

       }

       ///\e

       DualExpr &operator-=(const DualExpr &e) {

 	for (Base::const_iterator j=e.begin(); j!=e.end(); ++j)

 	  (*this)[j->first]-=j->second;

 	return *this;

       }

       ///\e

       DualExpr &operator*=(const Value &c) {

 	for (Base::iterator j=Base::begin(); j!=Base::end(); ++j)

 	  j->second*=c;

 	return *this;

       }

       ///\e

       DualExpr &operator/=(const Value &c) {

 	for (Base::iterator j=Base::begin(); j!=Base::end(); ++j)

 	  j->second/=c;

 	return *this;

       }

     };

   protected:

     _FixId rows;

     _FixId cols;

     //Abstract virtual functions

     virtual LpSolverBase &_newLp() = 0;

     virtual LpSolverBase &_copyLp(){

       ///\todo This should be implemented here, too,  when we have problem retrieving routines. It can be overriden.

       //Starting:

       LpSolverBase & newlp(_newLp());

       return newlp;

       //return *(LpSolverBase*)0;

     };

     virtual int _addCol() = 0;

     virtual int _addRow() = 0;

     virtual void _eraseCol(int col) = 0;

     virtual void _eraseRow(int row) = 0;

     virtual void _setRowCoeffs(int i, 

 			       int length,

                                int  const * indices, 

                                Value  const * values ) = 0;

     virtual void _setColCoeffs(int i, 

 			       int length,

                                int  const * indices, 

                                Value  const * values ) = 0;

     virtual void _setCoeff(int row, int col, Value value) = 0;

     virtual void _setColLowerBound(int i, Value value) = 0;

     virtual void _setColUpperBound(int i, Value value) = 0;

 //     virtual void _setRowLowerBound(int i, Value value) = 0;

 //     virtual void _setRowUpperBound(int i, Value value) = 0;

     virtual void _setRowBounds(int i, Value lower, Value upper) = 0;

     virtual void _setObjCoeff(int i, Value obj_coef) = 0;

     virtual void _clearObj()=0;

 //     virtual void _setObj(int length,

 //                          int  const * indices, 

 //                          Value  const * values ) = 0;

     virtual SolveExitStatus _solve() = 0;

     virtual Value _getPrimal(int i) = 0;

     virtual Value _getDual(int i) = 0;

     virtual Value _getPrimalValue() = 0;

     virtual SolutionStatus _getPrimalStatus() = 0;

     virtual SolutionStatus _getDualStatus() = 0;

     ///\todo This could be implemented here, too, using _getPrimalStatus() and

     ///_getDualStatus()

     virtual ProblemTypes _getProblemType() = 0;

     virtual void _setMax() = 0;

     virtual void _setMin() = 0;

     //Own protected stuff

     //Constant component of the objective function

     Value obj_const_comp;

   public:

     ///\e

     LpSolverBase() : obj_const_comp(0) {}

     ///\e

     virtual ~LpSolverBase() {}

     ///Creates a new LP problem

     LpSolverBase &newLp() {return _newLp();}

     ///Makes a copy of the LP problem

     LpSolverBase &copyLp() {return _copyLp();}

     ///\name Build up and modify the LP

     ///@{

     ///Add a new empty column (i.e a new variable) to the LP

     Col addCol() { Col c; c.id=cols.insert(_addCol()); return c;}

     ///\brief Adds several new columns

     ///(i.e a variables) at once

     ///

     ///This magic function takes a container as its argument

     ///and fills its elements

     ///with new columns (i.e. variables)

     ///\param t can be

     ///- a standard STL compatible iterable container with

     ///\ref Col as its \c values_type

     ///like

     ///\code

     ///std::vector<LpSolverBase::Col>

     ///std::list<LpSolverBase::Col>

     ///\endcode

     ///- a standard STL compatible iterable container with

     ///\ref Col as its \c mapped_type

     ///like

     ///\code

     ///std::map<AnyType,LpSolverBase::Col>

     ///\endcode

     ///- an iterable lemon \ref concept::WriteMap "write map" like 

     ///\code

     ///ListGraph::NodeMap<LpSolverBase::Col>

     ///ListGraph::EdgeMap<LpSolverBase::Col>

     ///\endcode

     ///\return The number of the created column.

 #ifdef DOXYGEN

     template<class T>

     int addColSet(T &t) { return 0;} 

 #else

     template<class T>

     typename enable_if<typename T::value_type::LpSolverCol,int>::type

     addColSet(T &t,dummy<0> = 0) {

       int s=0;

       for(typename T::iterator i=t.begin();i!=t.end();++i) {*i=addCol();s++;}

       return s;

     }

     template<class T>

     typename enable_if<typename T::value_type::second_type::LpSolverCol,

 		       int>::type

     addColSet(T &t,dummy<1> = 1) { 

       int s=0;

       for(typename T::iterator i=t.begin();i!=t.end();++i) {

 	i->second=addCol();

 	s++;

       }

       return s;

     }

     template<class T>

     typename enable_if<typename T::ValueSet::value_type::LpSolverCol,

 		       int>::type

     addColSet(T &t,dummy<2> = 2) { 

       ///\bug <tt>return addColSet(t.valueSet());</tt> should also work.

       int s=0;

       for(typename T::ValueSet::iterator i=t.valueSet().begin();

 	  i!=t.valueSet().end();

 	  ++i)

 	{

 	  *i=addCol();

 	  s++;

 	}

       return s;

     }

 #endif

     ///Set a column (i.e a dual constraint) of the LP

     ///\param c is the column to be modified

     ///\param e is a dual linear expression (see \ref DualExpr)

     ///\bug This is a temporary function. The interface will change to

     ///a better one.

     void setCol(Col c,const DualExpr &e) {

       std::vector<int> indices;

       std::vector<Value> values;

       indices.push_back(0);

       values.push_back(0);

       for(DualExpr::const_iterator i=e.begin(); i!=e.end(); ++i)

 	if((*i).second!=0) { ///\bug EPSILON would be necessary here!!!

 	  indices.push_back(rows.floatingId((*i).first.id));

 	  values.push_back((*i).second);

 	}

       _setColCoeffs(cols.floatingId(c.id),indices.size()-1,

 		    &indices[0],&values[0]);

     }

     ///Add a new column to the LP

     ///\param e is a dual linear expression (see \ref DualExpr)

     ///\param obj is the corresponding component of the objective

     ///function. It is 0 by default.

     ///\return The created column.

     ///\bug This is a temportary function. The interface will change to

     ///a better one.

     Col addCol(const DualExpr &e, Value obj=0) {

       Col c=addCol();

       setCol(c,e);

       objCoeff(c,obj);

       return c;

     }

     ///Add a new empty row (i.e a new constraint) to the LP

     ///This function adds a new empty row (i.e a new constraint) to the LP.

     ///\return The created row

     Row addRow() { Row r; r.id=rows.insert(_addRow()); return r;}

     ///\brief Add several new rows

     ///(i.e a constraints) at once

     ///

     ///This magic function takes a container as its argument

     ///and fills its elements

     ///with new row (i.e. variables)

     ///\param t can be

     ///- a standard STL compatible iterable container with

     ///\ref Row as its \c values_type

     ///like

     ///\code

     ///std::vector<LpSolverBase::Row>

     ///std::list<LpSolverBase::Row>

     ///\endcode

     ///- a standard STL compatible iterable container with

     ///\ref Row as its \c mapped_type

     ///like

     ///\code

     ///std::map<AnyType,LpSolverBase::Row>

     ///\endcode

     ///- an iterable lemon \ref concept::WriteMap "write map" like 

     ///\code

     ///ListGraph::NodeMap<LpSolverBase::Row>

     ///ListGraph::EdgeMap<LpSolverBase::Row>

     ///\endcode

     ///\return The number of rows created.

 #ifdef DOXYGEN

     template<class T>

     int addRowSet(T &t) { return 0;} 

 #else

     template<class T>

     typename enable_if<typename T::value_type::LpSolverRow,int>::type

     addRowSet(T &t,dummy<0> = 0) {

       int s=0;

       for(typename T::iterator i=t.begin();i!=t.end();++i) {*i=addRow();s++;}

       return s;

     }

     template<class T>

     typename enable_if<typename T::value_type::second_type::LpSolverRow,

 		       int>::type

     addRowSet(T &t,dummy<1> = 1) { 

       int s=0;

       for(typename T::iterator i=t.begin();i!=t.end();++i) {

 	i->second=addRow();

 	s++;

       }

       return s;

     }

     template<class T>

     typename enable_if<typename T::ValueSet::value_type::LpSolverRow,

 		       int>::type

     addRowSet(T &t,dummy<2> = 2) { 

       ///\bug <tt>return addRowSet(t.valueSet());</tt> should also work.

       int s=0;

       for(typename T::ValueSet::iterator i=t.valueSet().begin();

 	  i!=t.valueSet().end();

 	  ++i)

 	{

 	  *i=addRow();

 	  s++;

 	}

       return s;

     }

 #endif

     ///Set a row (i.e a constraint) of the LP

     ///\param r is the row to be modified

     ///\param l is lower bound (-\ref INF means no bound)

     ///\param e is a linear expression (see \ref Expr)

     ///\param u is the upper bound (\ref INF means no bound)

     ///\bug This is a temportary function. The interface will change to

     ///a better one.

     ///\todo Option to control whether a constraint with a single variable is

     ///added or not.

     void setRow(Row r, Value l,const Expr &e, Value u) {

       std::vector<int> indices;

       std::vector<Value> values;

       indices.push_back(0);

       values.push_back(0);

       for(Expr::const_iterator i=e.begin(); i!=e.end(); ++i)

 	if((*i).second!=0) { ///\bug EPSILON would be necessary here!!!

 	  indices.push_back(cols.floatingId((*i).first.id));

 	  values.push_back((*i).second);

 	}

       _setRowCoeffs(rows.floatingId(r.id),indices.size()-1,

 		    &indices[0],&values[0]);

 //       _setRowLowerBound(rows.floatingId(r.id),l-e.constComp());

 //       _setRowUpperBound(rows.floatingId(r.id),u-e.constComp());

        _setRowBounds(rows.floatingId(r.id),l-e.constComp(),u-e.constComp());

     }

     ///Set a row (i.e a constraint) of the LP

     ///\param r is the row to be modified

     ///\param c is a linear expression (see \ref Constr)

     void setRow(Row r, const Constr &c) {

       setRow(r,

 	     c.lowerBounded()?c.lowerBound():-INF,

 	     c.expr(),

 	     c.upperBounded()?c.upperBound():INF);

     }

     ///Add a new row (i.e a new constraint) to the LP

     ///\param l is the lower bound (-\ref INF means no bound)

     ///\param e is a linear expression (see \ref Expr)

     ///\param u is the upper bound (\ref INF means no bound)

     ///\return The created row.

     ///\bug This is a temportary function. The interface will change to

     ///a better one.

     Row addRow(Value l,const Expr &e, Value u) {

       Row r=addRow();

       setRow(r,l,e,u);

       return r;

     }

     ///Add a new row (i.e a new constraint) to the LP

     ///\param c is a linear expression (see \ref Constr)

     ///\return The created row.

     Row addRow(const Constr &c) {

       Row r=addRow();

       setRow(r,c);

       return r;

     }

     ///Erase a coloumn (i.e a variable) from the LP

     ///\param c is the coloumn to be deleted

     ///\todo Please check this

     void eraseCol(Col c) {

       _eraseCol(cols.floatingId(c.id));

       cols.erase(c.id);

     }

     ///Erase a  row (i.e a constraint) from the LP

     ///\param r is the row to be deleted

     ///\todo Please check this

     void eraseRow(Row r) {

       _eraseRow(rows.floatingId(r.id));

       rows.erase(r.id);

     }

     ///Set an element of the coefficient matrix of the LP

     ///\param r is the row of the element to be modified

     ///\param c is the coloumn of the element to be modified

     ///\param val is the new value of the coefficient

     void setCoeff(Row r, Col c, Value val){

       _setCoeff(rows.floatingId(r.id),cols.floatingId(c.id), val);

     }

     /// Set the lower bound of a column (i.e a variable)

     /// The upper bound of a variable (column) has to be given by an 

     /// extended number of type Value, i.e. a finite number of type 

     /// Value or -\ref INF.

     void colLowerBound(Col c, Value value) {

       _setColLowerBound(cols.floatingId(c.id),value);

     }

     /// Set the upper bound of a column (i.e a variable)

     /// The upper bound of a variable (column) has to be given by an 

     /// extended number of type Value, i.e. a finite number of type 

     /// Value or \ref INF.

     void colUpperBound(Col c, Value value) {

       _setColUpperBound(cols.floatingId(c.id),value);

     };

     /// Set the lower and the upper bounds of a column (i.e a variable)

     /// The lower and the upper bounds of

     /// a variable (column) have to be given by an 

     /// extended number of type Value, i.e. a finite number of type 

     /// Value, -\ref INF or \ref INF.

     void colBounds(Col c, Value lower, Value upper) {

       _setColLowerBound(cols.floatingId(c.id),lower);

       _setColUpperBound(cols.floatingId(c.id),upper);

     }

 //     /// Set the lower bound of a row (i.e a constraint)

 //     /// The lower bound of a linear expression (row) has to be given by an 

 //     /// extended number of type Value, i.e. a finite number of type 

 //     /// Value or -\ref INF.

 //     void rowLowerBound(Row r, Value value) {

 //       _setRowLowerBound(rows.floatingId(r.id),value);

 //     };

 //     /// Set the upper bound of a row (i.e a constraint)

 //     /// The upper bound of a linear expression (row) has to be given by an 

 //     /// extended number of type Value, i.e. a finite number of type 

 //     /// Value or \ref INF.

 //     void rowUpperBound(Row r, Value value) {

 //       _setRowUpperBound(rows.floatingId(r.id),value);

 //     };

     /// Set the lower and the upper bounds of a row (i.e a constraint)

     /// The lower and the upper bounds of

     /// a constraint (row) have to be given by an 

     /// extended number of type Value, i.e. a finite number of type 

     /// Value, -\ref INF or \ref INF.

     void rowBounds(Row c, Value lower, Value upper) {

       _setRowBounds(rows.floatingId(c.id),lower, upper);

       // _setRowUpperBound(rows.floatingId(c.id),upper);

     }

     ///Set an element of the objective function

     void objCoeff(Col c, Value v) {_setObjCoeff(cols.floatingId(c.id),v); };

     ///Set the objective function

     ///\param e is a linear expression of type \ref Expr.

     ///\bug The previous objective function is not cleared!

     void setObj(Expr e) {

       _clearObj();

       for (Expr::iterator i=e.begin(); i!=e.end(); ++i)

 	objCoeff((*i).first,(*i).second);

       obj_const_comp=e.constComp();

     }

     ///Maximize

     void max() { _setMax(); }

     ///Minimize

     void min() { _setMin(); }

     ///@}

     ///\name Solve the LP

     ///@{

     ///\e Solve the LP problem at hand

     ///

     ///\return The result of the optimization procedure. Possible values and their meanings can be found in the documentation of \ref SolveExitStatus.

     ///

     ///\todo Which method is used to solve the problem

     SolveExitStatus solve() { return _solve(); }

     ///@}

     ///\name Obtain the solution

     ///@{

     /// The status of the primal problem (the original LP problem)

     SolutionStatus primalStatus() {

       return _getPrimalStatus();

     }

     /// The status of the dual (of the original LP) problem 

     SolutionStatus dualStatus() {

       return _getDualStatus();

     }

     ///The type of the original LP problem

     ProblemTypes problemType() {

       return _getProblemType();

     }

     ///\e

     Value primal(Col c) { return _getPrimal(cols.floatingId(c.id)); }

     ///\e

     Value dual(Row r) { return _getDual(rows.floatingId(r.id)); }

     ///\e

     ///\return

     ///- \ref INF or -\ref INF means either infeasibility or unboundedness

     /// of the primal problem, depending on whether we minimize or maximize.

     ///- \ref NaN if no primal solution is found.

     ///- The (finite) objective value if an optimal solution is found.

     Value primalValue() { return _getPrimalValue()+obj_const_comp;}

     ///@}

   };  

   ///\e

   ///\relates LpSolverBase::Expr

   ///

   inline LpSolverBase::Expr operator+(const LpSolverBase::Expr &a,

 				      const LpSolverBase::Expr &b) 

   {

     LpSolverBase::Expr tmp(a);

     tmp+=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Expr

   ///

   inline LpSolverBase::Expr operator-(const LpSolverBase::Expr &a,

 				      const LpSolverBase::Expr &b) 

   {

     LpSolverBase::Expr tmp(a);

     tmp-=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Expr

   ///

   inline LpSolverBase::Expr operator*(const LpSolverBase::Expr &a,

 				      const LpSolverBase::Value &b) 

   {

     LpSolverBase::Expr tmp(a);

     tmp*=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Expr

   ///

   inline LpSolverBase::Expr operator*(const LpSolverBase::Value &a,

 				      const LpSolverBase::Expr &b) 

   {

     LpSolverBase::Expr tmp(b);

     tmp*=a;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Expr

   ///

   inline LpSolverBase::Expr operator/(const LpSolverBase::Expr &a,

 				      const LpSolverBase::Value &b) 

   {

     LpSolverBase::Expr tmp(a);

     tmp/=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator<=(const LpSolverBase::Expr &e,

 					 const LpSolverBase::Expr &f) 

   {

     return LpSolverBase::Constr(-LpSolverBase::INF,e-f,0);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator<=(const LpSolverBase::Value &e,

 					 const LpSolverBase::Expr &f) 

   {

     return LpSolverBase::Constr(e,f);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator<=(const LpSolverBase::Expr &e,

 					 const LpSolverBase::Value &f) 

   {

     return LpSolverBase::Constr(e,f);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator>=(const LpSolverBase::Expr &e,

 					 const LpSolverBase::Expr &f) 

   {

     return LpSolverBase::Constr(-LpSolverBase::INF,f-e,0);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator>=(const LpSolverBase::Value &e,

 					 const LpSolverBase::Expr &f) 

   {

     return LpSolverBase::Constr(f,e);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator>=(const LpSolverBase::Expr &e,

 					 const LpSolverBase::Value &f) 

   {

     return LpSolverBase::Constr(f,e);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator==(const LpSolverBase::Expr &e,

 					 const LpSolverBase::Expr &f) 

   {

     return LpSolverBase::Constr(0,e-f,0);

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator<=(const LpSolverBase::Value &n,

 					 const LpSolverBase::Constr&c) 

   {

     LpSolverBase::Constr tmp(c);

     ///\todo Create an own exception type.

     if(!isnan(tmp.lowerBound())) throw LogicError();

     else tmp.lowerBound()=n;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator<=(const LpSolverBase::Constr& c,

 					 const LpSolverBase::Value &n)

   {

     LpSolverBase::Constr tmp(c);

     ///\todo Create an own exception type.

     if(!isnan(tmp.upperBound())) throw LogicError();

     else tmp.upperBound()=n;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator>=(const LpSolverBase::Value &n,

 					 const LpSolverBase::Constr&c) 

   {

     LpSolverBase::Constr tmp(c);

     ///\todo Create an own exception type.

     if(!isnan(tmp.upperBound())) throw LogicError();

     else tmp.upperBound()=n;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::Constr

   ///

   inline LpSolverBase::Constr operator>=(const LpSolverBase::Constr& c,

 					 const LpSolverBase::Value &n)

   {

     LpSolverBase::Constr tmp(c);

     ///\todo Create an own exception type.

     if(!isnan(tmp.lowerBound())) throw LogicError();

     else tmp.lowerBound()=n;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::DualExpr

   ///

   inline LpSolverBase::DualExpr operator+(const LpSolverBase::DualExpr &a,

 				      const LpSolverBase::DualExpr &b) 

   {

     LpSolverBase::DualExpr tmp(a);

     tmp+=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::DualExpr

   ///

   inline LpSolverBase::DualExpr operator-(const LpSolverBase::DualExpr &a,

 				      const LpSolverBase::DualExpr &b) 

   {

     LpSolverBase::DualExpr tmp(a);

     tmp-=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::DualExpr

   ///

   inline LpSolverBase::DualExpr operator*(const LpSolverBase::DualExpr &a,

 				      const LpSolverBase::Value &b) 

   {

     LpSolverBase::DualExpr tmp(a);

     tmp*=b;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::DualExpr

   ///

   inline LpSolverBase::DualExpr operator*(const LpSolverBase::Value &a,

 				      const LpSolverBase::DualExpr &b) 

   {

     LpSolverBase::DualExpr tmp(b);

     tmp*=a;

     return tmp;

   }

   ///\e

   ///\relates LpSolverBase::DualExpr

   ///

   inline LpSolverBase::DualExpr operator/(const LpSolverBase::DualExpr &a,

 				      const LpSolverBase::Value &b) 

   {

     LpSolverBase::DualExpr tmp(a);

     tmp/=b;

     return tmp;

   }

 } //namespace lemon

 #endif //LEMON_LP_BASE_H