lemon/lp_base.h
author Peter Kovacs <kpeter@inf.elte.hu>
Fri, 17 Apr 2009 18:04:36 +0200
changeset 609 e6927fe719e6
parent 487 06787db0ef5f
child 540 9db62975c32b
permissions -rw-r--r--
Support >= and <= constraints in NetworkSimplex (#219, #234)

By default the same inequality constraints are supported as by
Circulation (the GEQ form), but the LEQ form can also be selected
using the problemType() function.

The documentation of the min. cost flow module is reworked and
extended with important notes and explanations about the different
variants of the problem and about the dual solution and optimality
conditions.
     1 /* -*- mode: C++; indent-tabs-mode: nil; -*-
     2  *
     3  * This file is a part of LEMON, a generic C++ optimization library.
     4  *
     5  * Copyright (C) 2003-2008
     6  * Egervary Jeno Kombinatorikus Optimalizalasi Kutatocsoport
     7  * (Egervary Research Group on Combinatorial Optimization, EGRES).
     8  *
     9  * Permission to use, modify and distribute this software is granted
    10  * provided that this copyright notice appears in all copies. For
    11  * precise terms see the accompanying LICENSE file.
    12  *
    13  * This software is provided "AS IS" with no warranty of any kind,
    14  * express or implied, and with no claim as to its suitability for any
    15  * purpose.
    16  *
    17  */
    18 
    19 #ifndef LEMON_LP_BASE_H
    20 #define LEMON_LP_BASE_H
    21 
    22 #include<iostream>
    23 #include<vector>
    24 #include<map>
    25 #include<limits>
    26 #include<lemon/math.h>
    27 
    28 #include<lemon/error.h>
    29 #include<lemon/assert.h>
    30 
    31 #include<lemon/core.h>
    32 #include<lemon/bits/solver_bits.h>
    33 
    34 ///\file
    35 ///\brief The interface of the LP solver interface.
    36 ///\ingroup lp_group
    37 namespace lemon {
    38 
    39   ///Common base class for LP and MIP solvers
    40 
    41   ///Usually this class is not used directly, please use one of the concrete
    42   ///implementations of the solver interface.
    43   ///\ingroup lp_group
    44   class LpBase {
    45 
    46   protected:
    47 
    48     _solver_bits::VarIndex rows;
    49     _solver_bits::VarIndex cols;
    50 
    51   public:
    52 
    53     ///Possible outcomes of an LP solving procedure
    54     enum SolveExitStatus {
    55       ///This means that the problem has been successfully solved: either
    56       ///an optimal solution has been found or infeasibility/unboundedness
    57       ///has been proved.
    58       SOLVED = 0,
    59       ///Any other case (including the case when some user specified
    60       ///limit has been exceeded)
    61       UNSOLVED = 1
    62     };
    63 
    64     ///Direction of the optimization
    65     enum Sense {
    66       /// Minimization
    67       MIN,
    68       /// Maximization
    69       MAX
    70     };
    71 
    72     ///The floating point type used by the solver
    73     typedef double Value;
    74     ///The infinity constant
    75     static const Value INF;
    76     ///The not a number constant
    77     static const Value NaN;
    78 
    79     friend class Col;
    80     friend class ColIt;
    81     friend class Row;
    82     friend class RowIt;
    83 
    84     ///Refer to a column of the LP.
    85 
    86     ///This type is used to refer to a column of the LP.
    87     ///
    88     ///Its value remains valid and correct even after the addition or erase of
    89     ///other columns.
    90     ///
    91     ///\note This class is similar to other Item types in LEMON, like
    92     ///Node and Arc types in digraph.
    93     class Col {
    94       friend class LpBase;
    95     protected:
    96       int _id;
    97       explicit Col(int id) : _id(id) {}
    98     public:
    99       typedef Value ExprValue;
   100       typedef True LpCol;
   101       /// Default constructor
   102       
   103       /// \warning The default constructor sets the Col to an
   104       /// undefined value.
   105       Col() {}
   106       /// Invalid constructor \& conversion.
   107       
   108       /// This constructor initializes the Col to be invalid.
   109       /// \sa Invalid for more details.      
   110       Col(const Invalid&) : _id(-1) {}
   111       /// Equality operator
   112 
   113       /// Two \ref Col "Col"s are equal if and only if they point to
   114       /// the same LP column or both are invalid.
   115       bool operator==(Col c) const  {return _id == c._id;}
   116       /// Inequality operator
   117 
   118       /// \sa operator==(Col c)
   119       ///
   120       bool operator!=(Col c) const  {return _id != c._id;}
   121       /// Artificial ordering operator.
   122 
   123       /// To allow the use of this object in std::map or similar
   124       /// associative container we require this.
   125       ///
   126       /// \note This operator only have to define some strict ordering of
   127       /// the items; this order has nothing to do with the iteration
   128       /// ordering of the items.
   129       bool operator<(Col c) const  {return _id < c._id;}
   130     };
   131 
   132     ///Iterator for iterate over the columns of an LP problem
   133 
   134     /// Its usage is quite simple, for example you can count the number
   135     /// of columns in an LP \c lp:
   136     ///\code
   137     /// int count=0;
   138     /// for (LpBase::ColIt c(lp); c!=INVALID; ++c) ++count;
   139     ///\endcode
   140     class ColIt : public Col {
   141       const LpBase *_solver;
   142     public:
   143       /// Default constructor
   144       
   145       /// \warning The default constructor sets the iterator
   146       /// to an undefined value.
   147       ColIt() {}
   148       /// Sets the iterator to the first Col
   149       
   150       /// Sets the iterator to the first Col.
   151       ///
   152       ColIt(const LpBase &solver) : _solver(&solver)
   153       {
   154         _solver->cols.firstItem(_id);
   155       }
   156       /// Invalid constructor \& conversion
   157       
   158       /// Initialize the iterator to be invalid.
   159       /// \sa Invalid for more details.
   160       ColIt(const Invalid&) : Col(INVALID) {}
   161       /// Next column
   162       
   163       /// Assign the iterator to the next column.
   164       ///
   165       ColIt &operator++()
   166       {
   167         _solver->cols.nextItem(_id);
   168         return *this;
   169       }
   170     };
   171 
   172     /// \brief Returns the ID of the column.
   173     static int id(const Col& col) { return col._id; }
   174     /// \brief Returns the column with the given ID.
   175     ///
   176     /// \pre The argument should be a valid column ID in the LP problem.
   177     static Col colFromId(int id) { return Col(id); }
   178 
   179     ///Refer to a row of the LP.
   180 
   181     ///This type is used to refer to a row of the LP.
   182     ///
   183     ///Its value remains valid and correct even after the addition or erase of
   184     ///other rows.
   185     ///
   186     ///\note This class is similar to other Item types in LEMON, like
   187     ///Node and Arc types in digraph.
   188     class Row {
   189       friend class LpBase;
   190     protected:
   191       int _id;
   192       explicit Row(int id) : _id(id) {}
   193     public:
   194       typedef Value ExprValue;
   195       typedef True LpRow;
   196       /// Default constructor
   197       
   198       /// \warning The default constructor sets the Row to an
   199       /// undefined value.
   200       Row() {}
   201       /// Invalid constructor \& conversion.
   202       
   203       /// This constructor initializes the Row to be invalid.
   204       /// \sa Invalid for more details.      
   205       Row(const Invalid&) : _id(-1) {}
   206       /// Equality operator
   207 
   208       /// Two \ref Row "Row"s are equal if and only if they point to
   209       /// the same LP row or both are invalid.
   210       bool operator==(Row r) const  {return _id == r._id;}
   211       /// Inequality operator
   212       
   213       /// \sa operator==(Row r)
   214       ///
   215       bool operator!=(Row r) const  {return _id != r._id;}
   216       /// Artificial ordering operator.
   217 
   218       /// To allow the use of this object in std::map or similar
   219       /// associative container we require this.
   220       ///
   221       /// \note This operator only have to define some strict ordering of
   222       /// the items; this order has nothing to do with the iteration
   223       /// ordering of the items.
   224       bool operator<(Row r) const  {return _id < r._id;}
   225     };
   226 
   227     ///Iterator for iterate over the rows of an LP problem
   228 
   229     /// Its usage is quite simple, for example you can count the number
   230     /// of rows in an LP \c lp:
   231     ///\code
   232     /// int count=0;
   233     /// for (LpBase::RowIt c(lp); c!=INVALID; ++c) ++count;
   234     ///\endcode
   235     class RowIt : public Row {
   236       const LpBase *_solver;
   237     public:
   238       /// Default constructor
   239       
   240       /// \warning The default constructor sets the iterator
   241       /// to an undefined value.
   242       RowIt() {}
   243       /// Sets the iterator to the first Row
   244       
   245       /// Sets the iterator to the first Row.
   246       ///
   247       RowIt(const LpBase &solver) : _solver(&solver)
   248       {
   249         _solver->rows.firstItem(_id);
   250       }
   251       /// Invalid constructor \& conversion
   252       
   253       /// Initialize the iterator to be invalid.
   254       /// \sa Invalid for more details.
   255       RowIt(const Invalid&) : Row(INVALID) {}
   256       /// Next row
   257       
   258       /// Assign the iterator to the next row.
   259       ///
   260       RowIt &operator++()
   261       {
   262         _solver->rows.nextItem(_id);
   263         return *this;
   264       }
   265     };
   266 
   267     /// \brief Returns the ID of the row.
   268     static int id(const Row& row) { return row._id; }
   269     /// \brief Returns the row with the given ID.
   270     ///
   271     /// \pre The argument should be a valid row ID in the LP problem.
   272     static Row rowFromId(int id) { return Row(id); }
   273 
   274   public:
   275 
   276     ///Linear expression of variables and a constant component
   277 
   278     ///This data structure stores a linear expression of the variables
   279     ///(\ref Col "Col"s) and also has a constant component.
   280     ///
   281     ///There are several ways to access and modify the contents of this
   282     ///container.
   283     ///\code
   284     ///e[v]=5;
   285     ///e[v]+=12;
   286     ///e.erase(v);
   287     ///\endcode
   288     ///or you can also iterate through its elements.
   289     ///\code
   290     ///double s=0;
   291     ///for(LpBase::Expr::ConstCoeffIt i(e);i!=INVALID;++i)
   292     ///  s+=*i * primal(i);
   293     ///\endcode
   294     ///(This code computes the primal value of the expression).
   295     ///- Numbers (<tt>double</tt>'s)
   296     ///and variables (\ref Col "Col"s) directly convert to an
   297     ///\ref Expr and the usual linear operations are defined, so
   298     ///\code
   299     ///v+w
   300     ///2*v-3.12*(v-w/2)+2
   301     ///v*2.1+(3*v+(v*12+w+6)*3)/2
   302     ///\endcode
   303     ///are valid expressions.
   304     ///The usual assignment operations are also defined.
   305     ///\code
   306     ///e=v+w;
   307     ///e+=2*v-3.12*(v-w/2)+2;
   308     ///e*=3.4;
   309     ///e/=5;
   310     ///\endcode
   311     ///- The constant member can be set and read by dereference
   312     ///  operator (unary *)
   313     ///
   314     ///\code
   315     ///*e=12;
   316     ///double c=*e;
   317     ///\endcode
   318     ///
   319     ///\sa Constr
   320     class Expr {
   321       friend class LpBase;
   322     public:
   323       /// The key type of the expression
   324       typedef LpBase::Col Key;
   325       /// The value type of the expression
   326       typedef LpBase::Value Value;
   327 
   328     protected:
   329       Value const_comp;
   330       std::map<int, Value> comps;
   331 
   332     public:
   333       typedef True SolverExpr;
   334       /// Default constructor
   335       
   336       /// Construct an empty expression, the coefficients and
   337       /// the constant component are initialized to zero.
   338       Expr() : const_comp(0) {}
   339       /// Construct an expression from a column
   340 
   341       /// Construct an expression, which has a term with \c c variable
   342       /// and 1.0 coefficient.
   343       Expr(const Col &c) : const_comp(0) {
   344         typedef std::map<int, Value>::value_type pair_type;
   345         comps.insert(pair_type(id(c), 1));
   346       }
   347       /// Construct an expression from a constant
   348 
   349       /// Construct an expression, which's constant component is \c v.
   350       ///
   351       Expr(const Value &v) : const_comp(v) {}
   352       /// Returns the coefficient of the column
   353       Value operator[](const Col& c) const {
   354         std::map<int, Value>::const_iterator it=comps.find(id(c));
   355         if (it != comps.end()) {
   356           return it->second;
   357         } else {
   358           return 0;
   359         }
   360       }
   361       /// Returns the coefficient of the column
   362       Value& operator[](const Col& c) {
   363         return comps[id(c)];
   364       }
   365       /// Sets the coefficient of the column
   366       void set(const Col &c, const Value &v) {
   367         if (v != 0.0) {
   368           typedef std::map<int, Value>::value_type pair_type;
   369           comps.insert(pair_type(id(c), v));
   370         } else {
   371           comps.erase(id(c));
   372         }
   373       }
   374       /// Returns the constant component of the expression
   375       Value& operator*() { return const_comp; }
   376       /// Returns the constant component of the expression
   377       const Value& operator*() const { return const_comp; }
   378       /// \brief Removes the coefficients which's absolute value does
   379       /// not exceed \c epsilon. It also sets to zero the constant
   380       /// component, if it does not exceed epsilon in absolute value.
   381       void simplify(Value epsilon = 0.0) {
   382         std::map<int, Value>::iterator it=comps.begin();
   383         while (it != comps.end()) {
   384           std::map<int, Value>::iterator jt=it;
   385           ++jt;
   386           if (std::fabs((*it).second) <= epsilon) comps.erase(it);
   387           it=jt;
   388         }
   389         if (std::fabs(const_comp) <= epsilon) const_comp = 0;
   390       }
   391 
   392       void simplify(Value epsilon = 0.0) const {
   393         const_cast<Expr*>(this)->simplify(epsilon);
   394       }
   395 
   396       ///Sets all coefficients and the constant component to 0.
   397       void clear() {
   398         comps.clear();
   399         const_comp=0;
   400       }
   401 
   402       ///Compound assignment
   403       Expr &operator+=(const Expr &e) {
   404         for (std::map<int, Value>::const_iterator it=e.comps.begin();
   405              it!=e.comps.end(); ++it)
   406           comps[it->first]+=it->second;
   407         const_comp+=e.const_comp;
   408         return *this;
   409       }
   410       ///Compound assignment
   411       Expr &operator-=(const Expr &e) {
   412         for (std::map<int, Value>::const_iterator it=e.comps.begin();
   413              it!=e.comps.end(); ++it)
   414           comps[it->first]-=it->second;
   415         const_comp-=e.const_comp;
   416         return *this;
   417       }
   418       ///Multiply with a constant
   419       Expr &operator*=(const Value &v) {
   420         for (std::map<int, Value>::iterator it=comps.begin();
   421              it!=comps.end(); ++it)
   422           it->second*=v;
   423         const_comp*=v;
   424         return *this;
   425       }
   426       ///Division with a constant
   427       Expr &operator/=(const Value &c) {
   428         for (std::map<int, Value>::iterator it=comps.begin();
   429              it!=comps.end(); ++it)
   430           it->second/=c;
   431         const_comp/=c;
   432         return *this;
   433       }
   434 
   435       ///Iterator over the expression
   436       
   437       ///The iterator iterates over the terms of the expression. 
   438       /// 
   439       ///\code
   440       ///double s=0;
   441       ///for(LpBase::Expr::CoeffIt i(e);i!=INVALID;++i)
   442       ///  s+= *i * primal(i);
   443       ///\endcode
   444       class CoeffIt {
   445       private:
   446 
   447         std::map<int, Value>::iterator _it, _end;
   448 
   449       public:
   450 
   451         /// Sets the iterator to the first term
   452         
   453         /// Sets the iterator to the first term of the expression.
   454         ///
   455         CoeffIt(Expr& e)
   456           : _it(e.comps.begin()), _end(e.comps.end()){}
   457 
   458         /// Convert the iterator to the column of the term
   459         operator Col() const {
   460           return colFromId(_it->first);
   461         }
   462 
   463         /// Returns the coefficient of the term
   464         Value& operator*() { return _it->second; }
   465 
   466         /// Returns the coefficient of the term
   467         const Value& operator*() const { return _it->second; }
   468         /// Next term
   469         
   470         /// Assign the iterator to the next term.
   471         ///
   472         CoeffIt& operator++() { ++_it; return *this; }
   473 
   474         /// Equality operator
   475         bool operator==(Invalid) const { return _it == _end; }
   476         /// Inequality operator
   477         bool operator!=(Invalid) const { return _it != _end; }
   478       };
   479 
   480       /// Const iterator over the expression
   481       
   482       ///The iterator iterates over the terms of the expression. 
   483       /// 
   484       ///\code
   485       ///double s=0;
   486       ///for(LpBase::Expr::ConstCoeffIt i(e);i!=INVALID;++i)
   487       ///  s+=*i * primal(i);
   488       ///\endcode
   489       class ConstCoeffIt {
   490       private:
   491 
   492         std::map<int, Value>::const_iterator _it, _end;
   493 
   494       public:
   495 
   496         /// Sets the iterator to the first term
   497         
   498         /// Sets the iterator to the first term of the expression.
   499         ///
   500         ConstCoeffIt(const Expr& e)
   501           : _it(e.comps.begin()), _end(e.comps.end()){}
   502 
   503         /// Convert the iterator to the column of the term
   504         operator Col() const {
   505           return colFromId(_it->first);
   506         }
   507 
   508         /// Returns the coefficient of the term
   509         const Value& operator*() const { return _it->second; }
   510 
   511         /// Next term
   512         
   513         /// Assign the iterator to the next term.
   514         ///
   515         ConstCoeffIt& operator++() { ++_it; return *this; }
   516 
   517         /// Equality operator
   518         bool operator==(Invalid) const { return _it == _end; }
   519         /// Inequality operator
   520         bool operator!=(Invalid) const { return _it != _end; }
   521       };
   522 
   523     };
   524 
   525     ///Linear constraint
   526 
   527     ///This data stucture represents a linear constraint in the LP.
   528     ///Basically it is a linear expression with a lower or an upper bound
   529     ///(or both). These parts of the constraint can be obtained by the member
   530     ///functions \ref expr(), \ref lowerBound() and \ref upperBound(),
   531     ///respectively.
   532     ///There are two ways to construct a constraint.
   533     ///- You can set the linear expression and the bounds directly
   534     ///  by the functions above.
   535     ///- The operators <tt>\<=</tt>, <tt>==</tt> and  <tt>\>=</tt>
   536     ///  are defined between expressions, or even between constraints whenever
   537     ///  it makes sense. Therefore if \c e and \c f are linear expressions and
   538     ///  \c s and \c t are numbers, then the followings are valid expressions
   539     ///  and thus they can be used directly e.g. in \ref addRow() whenever
   540     ///  it makes sense.
   541     ///\code
   542     ///  e<=s
   543     ///  e<=f
   544     ///  e==f
   545     ///  s<=e<=t
   546     ///  e>=t
   547     ///\endcode
   548     ///\warning The validity of a constraint is checked only at run
   549     ///time, so e.g. \ref addRow(<tt>x[1]\<=x[2]<=5</tt>) will
   550     ///compile, but will fail an assertion.
   551     class Constr
   552     {
   553     public:
   554       typedef LpBase::Expr Expr;
   555       typedef Expr::Key Key;
   556       typedef Expr::Value Value;
   557 
   558     protected:
   559       Expr _expr;
   560       Value _lb,_ub;
   561     public:
   562       ///\e
   563       Constr() : _expr(), _lb(NaN), _ub(NaN) {}
   564       ///\e
   565       Constr(Value lb, const Expr &e, Value ub) :
   566         _expr(e), _lb(lb), _ub(ub) {}
   567       Constr(const Expr &e) :
   568         _expr(e), _lb(NaN), _ub(NaN) {}
   569       ///\e
   570       void clear()
   571       {
   572         _expr.clear();
   573         _lb=_ub=NaN;
   574       }
   575 
   576       ///Reference to the linear expression
   577       Expr &expr() { return _expr; }
   578       ///Cont reference to the linear expression
   579       const Expr &expr() const { return _expr; }
   580       ///Reference to the lower bound.
   581 
   582       ///\return
   583       ///- \ref INF "INF": the constraint is lower unbounded.
   584       ///- \ref NaN "NaN": lower bound has not been set.
   585       ///- finite number: the lower bound
   586       Value &lowerBound() { return _lb; }
   587       ///The const version of \ref lowerBound()
   588       const Value &lowerBound() const { return _lb; }
   589       ///Reference to the upper bound.
   590 
   591       ///\return
   592       ///- \ref INF "INF": the constraint is upper unbounded.
   593       ///- \ref NaN "NaN": upper bound has not been set.
   594       ///- finite number: the upper bound
   595       Value &upperBound() { return _ub; }
   596       ///The const version of \ref upperBound()
   597       const Value &upperBound() const { return _ub; }
   598       ///Is the constraint lower bounded?
   599       bool lowerBounded() const {
   600         return _lb != -INF && !isNaN(_lb);
   601       }
   602       ///Is the constraint upper bounded?
   603       bool upperBounded() const {
   604         return _ub != INF && !isNaN(_ub);
   605       }
   606 
   607     };
   608 
   609     ///Linear expression of rows
   610 
   611     ///This data structure represents a column of the matrix,
   612     ///thas is it strores a linear expression of the dual variables
   613     ///(\ref Row "Row"s).
   614     ///
   615     ///There are several ways to access and modify the contents of this
   616     ///container.
   617     ///\code
   618     ///e[v]=5;
   619     ///e[v]+=12;
   620     ///e.erase(v);
   621     ///\endcode
   622     ///or you can also iterate through its elements.
   623     ///\code
   624     ///double s=0;
   625     ///for(LpBase::DualExpr::ConstCoeffIt i(e);i!=INVALID;++i)
   626     ///  s+=*i;
   627     ///\endcode
   628     ///(This code computes the sum of all coefficients).
   629     ///- Numbers (<tt>double</tt>'s)
   630     ///and variables (\ref Row "Row"s) directly convert to an
   631     ///\ref DualExpr and the usual linear operations are defined, so
   632     ///\code
   633     ///v+w
   634     ///2*v-3.12*(v-w/2)
   635     ///v*2.1+(3*v+(v*12+w)*3)/2
   636     ///\endcode
   637     ///are valid \ref DualExpr dual expressions.
   638     ///The usual assignment operations are also defined.
   639     ///\code
   640     ///e=v+w;
   641     ///e+=2*v-3.12*(v-w/2);
   642     ///e*=3.4;
   643     ///e/=5;
   644     ///\endcode
   645     ///
   646     ///\sa Expr
   647     class DualExpr {
   648       friend class LpBase;
   649     public:
   650       /// The key type of the expression
   651       typedef LpBase::Row Key;
   652       /// The value type of the expression
   653       typedef LpBase::Value Value;
   654 
   655     protected:
   656       std::map<int, Value> comps;
   657 
   658     public:
   659       typedef True SolverExpr;
   660       /// Default constructor
   661       
   662       /// Construct an empty expression, the coefficients are
   663       /// initialized to zero.
   664       DualExpr() {}
   665       /// Construct an expression from a row
   666 
   667       /// Construct an expression, which has a term with \c r dual
   668       /// variable and 1.0 coefficient.
   669       DualExpr(const Row &r) {
   670         typedef std::map<int, Value>::value_type pair_type;
   671         comps.insert(pair_type(id(r), 1));
   672       }
   673       /// Returns the coefficient of the row
   674       Value operator[](const Row& r) const {
   675         std::map<int, Value>::const_iterator it = comps.find(id(r));
   676         if (it != comps.end()) {
   677           return it->second;
   678         } else {
   679           return 0;
   680         }
   681       }
   682       /// Returns the coefficient of the row
   683       Value& operator[](const Row& r) {
   684         return comps[id(r)];
   685       }
   686       /// Sets the coefficient of the row
   687       void set(const Row &r, const Value &v) {
   688         if (v != 0.0) {
   689           typedef std::map<int, Value>::value_type pair_type;
   690           comps.insert(pair_type(id(r), v));
   691         } else {
   692           comps.erase(id(r));
   693         }
   694       }
   695       /// \brief Removes the coefficients which's absolute value does
   696       /// not exceed \c epsilon. 
   697       void simplify(Value epsilon = 0.0) {
   698         std::map<int, Value>::iterator it=comps.begin();
   699         while (it != comps.end()) {
   700           std::map<int, Value>::iterator jt=it;
   701           ++jt;
   702           if (std::fabs((*it).second) <= epsilon) comps.erase(it);
   703           it=jt;
   704         }
   705       }
   706 
   707       void simplify(Value epsilon = 0.0) const {
   708         const_cast<DualExpr*>(this)->simplify(epsilon);
   709       }
   710 
   711       ///Sets all coefficients to 0.
   712       void clear() {
   713         comps.clear();
   714       }
   715       ///Compound assignment
   716       DualExpr &operator+=(const DualExpr &e) {
   717         for (std::map<int, Value>::const_iterator it=e.comps.begin();
   718              it!=e.comps.end(); ++it)
   719           comps[it->first]+=it->second;
   720         return *this;
   721       }
   722       ///Compound assignment
   723       DualExpr &operator-=(const DualExpr &e) {
   724         for (std::map<int, Value>::const_iterator it=e.comps.begin();
   725              it!=e.comps.end(); ++it)
   726           comps[it->first]-=it->second;
   727         return *this;
   728       }
   729       ///Multiply with a constant
   730       DualExpr &operator*=(const Value &v) {
   731         for (std::map<int, Value>::iterator it=comps.begin();
   732              it!=comps.end(); ++it)
   733           it->second*=v;
   734         return *this;
   735       }
   736       ///Division with a constant
   737       DualExpr &operator/=(const Value &v) {
   738         for (std::map<int, Value>::iterator it=comps.begin();
   739              it!=comps.end(); ++it)
   740           it->second/=v;
   741         return *this;
   742       }
   743 
   744       ///Iterator over the expression
   745       
   746       ///The iterator iterates over the terms of the expression. 
   747       /// 
   748       ///\code
   749       ///double s=0;
   750       ///for(LpBase::DualExpr::CoeffIt i(e);i!=INVALID;++i)
   751       ///  s+= *i * dual(i);
   752       ///\endcode
   753       class CoeffIt {
   754       private:
   755 
   756         std::map<int, Value>::iterator _it, _end;
   757 
   758       public:
   759 
   760         /// Sets the iterator to the first term
   761         
   762         /// Sets the iterator to the first term of the expression.
   763         ///
   764         CoeffIt(DualExpr& e)
   765           : _it(e.comps.begin()), _end(e.comps.end()){}
   766 
   767         /// Convert the iterator to the row of the term
   768         operator Row() const {
   769           return rowFromId(_it->first);
   770         }
   771 
   772         /// Returns the coefficient of the term
   773         Value& operator*() { return _it->second; }
   774 
   775         /// Returns the coefficient of the term
   776         const Value& operator*() const { return _it->second; }
   777 
   778         /// Next term
   779         
   780         /// Assign the iterator to the next term.
   781         ///
   782         CoeffIt& operator++() { ++_it; return *this; }
   783 
   784         /// Equality operator
   785         bool operator==(Invalid) const { return _it == _end; }
   786         /// Inequality operator
   787         bool operator!=(Invalid) const { return _it != _end; }
   788       };
   789 
   790       ///Iterator over the expression
   791       
   792       ///The iterator iterates over the terms of the expression. 
   793       /// 
   794       ///\code
   795       ///double s=0;
   796       ///for(LpBase::DualExpr::ConstCoeffIt i(e);i!=INVALID;++i)
   797       ///  s+= *i * dual(i);
   798       ///\endcode
   799       class ConstCoeffIt {
   800       private:
   801 
   802         std::map<int, Value>::const_iterator _it, _end;
   803 
   804       public:
   805 
   806         /// Sets the iterator to the first term
   807         
   808         /// Sets the iterator to the first term of the expression.
   809         ///
   810         ConstCoeffIt(const DualExpr& e)
   811           : _it(e.comps.begin()), _end(e.comps.end()){}
   812 
   813         /// Convert the iterator to the row of the term
   814         operator Row() const {
   815           return rowFromId(_it->first);
   816         }
   817 
   818         /// Returns the coefficient of the term
   819         const Value& operator*() const { return _it->second; }
   820 
   821         /// Next term
   822         
   823         /// Assign the iterator to the next term.
   824         ///
   825         ConstCoeffIt& operator++() { ++_it; return *this; }
   826 
   827         /// Equality operator
   828         bool operator==(Invalid) const { return _it == _end; }
   829         /// Inequality operator
   830         bool operator!=(Invalid) const { return _it != _end; }
   831       };
   832     };
   833 
   834 
   835   protected:
   836 
   837     class InsertIterator {
   838     private:
   839 
   840       std::map<int, Value>& _host;
   841       const _solver_bits::VarIndex& _index;
   842 
   843     public:
   844 
   845       typedef std::output_iterator_tag iterator_category;
   846       typedef void difference_type;
   847       typedef void value_type;
   848       typedef void reference;
   849       typedef void pointer;
   850 
   851       InsertIterator(std::map<int, Value>& host,
   852                    const _solver_bits::VarIndex& index)
   853         : _host(host), _index(index) {}
   854 
   855       InsertIterator& operator=(const std::pair<int, Value>& value) {
   856         typedef std::map<int, Value>::value_type pair_type;
   857         _host.insert(pair_type(_index[value.first], value.second));
   858         return *this;
   859       }
   860 
   861       InsertIterator& operator*() { return *this; }
   862       InsertIterator& operator++() { return *this; }
   863       InsertIterator operator++(int) { return *this; }
   864 
   865     };
   866 
   867     class ExprIterator {
   868     private:
   869       std::map<int, Value>::const_iterator _host_it;
   870       const _solver_bits::VarIndex& _index;
   871     public:
   872 
   873       typedef std::bidirectional_iterator_tag iterator_category;
   874       typedef std::ptrdiff_t difference_type;
   875       typedef const std::pair<int, Value> value_type;
   876       typedef value_type reference;
   877 
   878       class pointer {
   879       public:
   880         pointer(value_type& _value) : value(_value) {}
   881         value_type* operator->() { return &value; }
   882       private:
   883         value_type value;
   884       };
   885 
   886       ExprIterator(const std::map<int, Value>::const_iterator& host_it,
   887                    const _solver_bits::VarIndex& index)
   888         : _host_it(host_it), _index(index) {}
   889 
   890       reference operator*() {
   891         return std::make_pair(_index(_host_it->first), _host_it->second);
   892       }
   893 
   894       pointer operator->() {
   895         return pointer(operator*());
   896       }
   897 
   898       ExprIterator& operator++() { ++_host_it; return *this; }
   899       ExprIterator operator++(int) {
   900         ExprIterator tmp(*this); ++_host_it; return tmp;
   901       }
   902 
   903       ExprIterator& operator--() { --_host_it; return *this; }
   904       ExprIterator operator--(int) {
   905         ExprIterator tmp(*this); --_host_it; return tmp;
   906       }
   907 
   908       bool operator==(const ExprIterator& it) const {
   909         return _host_it == it._host_it;
   910       }
   911 
   912       bool operator!=(const ExprIterator& it) const {
   913         return _host_it != it._host_it;
   914       }
   915 
   916     };
   917 
   918   protected:
   919 
   920     //Abstract virtual functions
   921     virtual LpBase* _newSolver() const = 0;
   922     virtual LpBase* _cloneSolver() const = 0;
   923 
   924     virtual int _addColId(int col) { return cols.addIndex(col); }
   925     virtual int _addRowId(int row) { return rows.addIndex(row); }
   926 
   927     virtual void _eraseColId(int col) { cols.eraseIndex(col); }
   928     virtual void _eraseRowId(int row) { rows.eraseIndex(row); }
   929 
   930     virtual int _addCol() = 0;
   931     virtual int _addRow() = 0;
   932 
   933     virtual void _eraseCol(int col) = 0;
   934     virtual void _eraseRow(int row) = 0;
   935 
   936     virtual void _getColName(int col, std::string& name) const = 0;
   937     virtual void _setColName(int col, const std::string& name) = 0;
   938     virtual int _colByName(const std::string& name) const = 0;
   939 
   940     virtual void _getRowName(int row, std::string& name) const = 0;
   941     virtual void _setRowName(int row, const std::string& name) = 0;
   942     virtual int _rowByName(const std::string& name) const = 0;
   943 
   944     virtual void _setRowCoeffs(int i, ExprIterator b, ExprIterator e) = 0;
   945     virtual void _getRowCoeffs(int i, InsertIterator b) const = 0;
   946 
   947     virtual void _setColCoeffs(int i, ExprIterator b, ExprIterator e) = 0;
   948     virtual void _getColCoeffs(int i, InsertIterator b) const = 0;
   949 
   950     virtual void _setCoeff(int row, int col, Value value) = 0;
   951     virtual Value _getCoeff(int row, int col) const = 0;
   952 
   953     virtual void _setColLowerBound(int i, Value value) = 0;
   954     virtual Value _getColLowerBound(int i) const = 0;
   955 
   956     virtual void _setColUpperBound(int i, Value value) = 0;
   957     virtual Value _getColUpperBound(int i) const = 0;
   958 
   959     virtual void _setRowLowerBound(int i, Value value) = 0;
   960     virtual Value _getRowLowerBound(int i) const = 0;
   961 
   962     virtual void _setRowUpperBound(int i, Value value) = 0;
   963     virtual Value _getRowUpperBound(int i) const = 0;
   964 
   965     virtual void _setObjCoeffs(ExprIterator b, ExprIterator e) = 0;
   966     virtual void _getObjCoeffs(InsertIterator b) const = 0;
   967 
   968     virtual void _setObjCoeff(int i, Value obj_coef) = 0;
   969     virtual Value _getObjCoeff(int i) const = 0;
   970 
   971     virtual void _setSense(Sense) = 0;
   972     virtual Sense _getSense() const = 0;
   973 
   974     virtual void _clear() = 0;
   975 
   976     virtual const char* _solverName() const = 0;
   977 
   978     //Own protected stuff
   979 
   980     //Constant component of the objective function
   981     Value obj_const_comp;
   982 
   983     LpBase() : rows(), cols(), obj_const_comp(0) {}
   984 
   985   public:
   986 
   987     /// Virtual destructor
   988     virtual ~LpBase() {}
   989 
   990     ///Creates a new LP problem
   991     LpBase* newSolver() {return _newSolver();}
   992     ///Makes a copy of the LP problem
   993     LpBase* cloneSolver() {return _cloneSolver();}
   994 
   995     ///Gives back the name of the solver.
   996     const char* solverName() const {return _solverName();}
   997 
   998     ///\name Build up and modify the LP
   999 
  1000     ///@{
  1001 
  1002     ///Add a new empty column (i.e a new variable) to the LP
  1003     Col addCol() { Col c; c._id = _addColId(_addCol()); return c;}
  1004 
  1005     ///\brief Adds several new columns (i.e variables) at once
  1006     ///
  1007     ///This magic function takes a container as its argument and fills
  1008     ///its elements with new columns (i.e. variables)
  1009     ///\param t can be
  1010     ///- a standard STL compatible iterable container with
  1011     ///\ref Col as its \c values_type like
  1012     ///\code
  1013     ///std::vector<LpBase::Col>
  1014     ///std::list<LpBase::Col>
  1015     ///\endcode
  1016     ///- a standard STL compatible iterable container with
  1017     ///\ref Col as its \c mapped_type like
  1018     ///\code
  1019     ///std::map<AnyType,LpBase::Col>
  1020     ///\endcode
  1021     ///- an iterable lemon \ref concepts::WriteMap "write map" like
  1022     ///\code
  1023     ///ListGraph::NodeMap<LpBase::Col>
  1024     ///ListGraph::ArcMap<LpBase::Col>
  1025     ///\endcode
  1026     ///\return The number of the created column.
  1027 #ifdef DOXYGEN
  1028     template<class T>
  1029     int addColSet(T &t) { return 0;}
  1030 #else
  1031     template<class T>
  1032     typename enable_if<typename T::value_type::LpCol,int>::type
  1033     addColSet(T &t,dummy<0> = 0) {
  1034       int s=0;
  1035       for(typename T::iterator i=t.begin();i!=t.end();++i) {*i=addCol();s++;}
  1036       return s;
  1037     }
  1038     template<class T>
  1039     typename enable_if<typename T::value_type::second_type::LpCol,
  1040                        int>::type
  1041     addColSet(T &t,dummy<1> = 1) {
  1042       int s=0;
  1043       for(typename T::iterator i=t.begin();i!=t.end();++i) {
  1044         i->second=addCol();
  1045         s++;
  1046       }
  1047       return s;
  1048     }
  1049     template<class T>
  1050     typename enable_if<typename T::MapIt::Value::LpCol,
  1051                        int>::type
  1052     addColSet(T &t,dummy<2> = 2) {
  1053       int s=0;
  1054       for(typename T::MapIt i(t); i!=INVALID; ++i)
  1055         {
  1056           i.set(addCol());
  1057           s++;
  1058         }
  1059       return s;
  1060     }
  1061 #endif
  1062 
  1063     ///Set a column (i.e a dual constraint) of the LP
  1064 
  1065     ///\param c is the column to be modified
  1066     ///\param e is a dual linear expression (see \ref DualExpr)
  1067     ///a better one.
  1068     void col(Col c, const DualExpr &e) {
  1069       e.simplify();
  1070       _setColCoeffs(cols(id(c)), ExprIterator(e.comps.begin(), rows),
  1071                     ExprIterator(e.comps.end(), rows));
  1072     }
  1073 
  1074     ///Get a column (i.e a dual constraint) of the LP
  1075 
  1076     ///\param c is the column to get
  1077     ///\return the dual expression associated to the column
  1078     DualExpr col(Col c) const {
  1079       DualExpr e;
  1080       _getColCoeffs(cols(id(c)), InsertIterator(e.comps, rows));
  1081       return e;
  1082     }
  1083 
  1084     ///Add a new column to the LP
  1085 
  1086     ///\param e is a dual linear expression (see \ref DualExpr)
  1087     ///\param o is the corresponding component of the objective
  1088     ///function. It is 0 by default.
  1089     ///\return The created column.
  1090     Col addCol(const DualExpr &e, Value o = 0) {
  1091       Col c=addCol();
  1092       col(c,e);
  1093       objCoeff(c,o);
  1094       return c;
  1095     }
  1096 
  1097     ///Add a new empty row (i.e a new constraint) to the LP
  1098 
  1099     ///This function adds a new empty row (i.e a new constraint) to the LP.
  1100     ///\return The created row
  1101     Row addRow() { Row r; r._id = _addRowId(_addRow()); return r;}
  1102 
  1103     ///\brief Add several new rows (i.e constraints) at once
  1104     ///
  1105     ///This magic function takes a container as its argument and fills
  1106     ///its elements with new row (i.e. variables)
  1107     ///\param t can be
  1108     ///- a standard STL compatible iterable container with
  1109     ///\ref Row as its \c values_type like
  1110     ///\code
  1111     ///std::vector<LpBase::Row>
  1112     ///std::list<LpBase::Row>
  1113     ///\endcode
  1114     ///- a standard STL compatible iterable container with
  1115     ///\ref Row as its \c mapped_type like
  1116     ///\code
  1117     ///std::map<AnyType,LpBase::Row>
  1118     ///\endcode
  1119     ///- an iterable lemon \ref concepts::WriteMap "write map" like
  1120     ///\code
  1121     ///ListGraph::NodeMap<LpBase::Row>
  1122     ///ListGraph::ArcMap<LpBase::Row>
  1123     ///\endcode
  1124     ///\return The number of rows created.
  1125 #ifdef DOXYGEN
  1126     template<class T>
  1127     int addRowSet(T &t) { return 0;}
  1128 #else
  1129     template<class T>
  1130     typename enable_if<typename T::value_type::LpRow,int>::type
  1131     addRowSet(T &t, dummy<0> = 0) {
  1132       int s=0;
  1133       for(typename T::iterator i=t.begin();i!=t.end();++i) {*i=addRow();s++;}
  1134       return s;
  1135     }
  1136     template<class T>
  1137     typename enable_if<typename T::value_type::second_type::LpRow, int>::type
  1138     addRowSet(T &t, dummy<1> = 1) {
  1139       int s=0;
  1140       for(typename T::iterator i=t.begin();i!=t.end();++i) {
  1141         i->second=addRow();
  1142         s++;
  1143       }
  1144       return s;
  1145     }
  1146     template<class T>
  1147     typename enable_if<typename T::MapIt::Value::LpRow, int>::type
  1148     addRowSet(T &t, dummy<2> = 2) {
  1149       int s=0;
  1150       for(typename T::MapIt i(t); i!=INVALID; ++i)
  1151         {
  1152           i.set(addRow());
  1153           s++;
  1154         }
  1155       return s;
  1156     }
  1157 #endif
  1158 
  1159     ///Set a row (i.e a constraint) of the LP
  1160 
  1161     ///\param r is the row to be modified
  1162     ///\param l is lower bound (-\ref INF means no bound)
  1163     ///\param e is a linear expression (see \ref Expr)
  1164     ///\param u is the upper bound (\ref INF means no bound)
  1165     void row(Row r, Value l, const Expr &e, Value u) {
  1166       e.simplify();
  1167       _setRowCoeffs(rows(id(r)), ExprIterator(e.comps.begin(), cols),
  1168                     ExprIterator(e.comps.end(), cols));
  1169       _setRowLowerBound(rows(id(r)),l - *e);
  1170       _setRowUpperBound(rows(id(r)),u - *e);
  1171     }
  1172 
  1173     ///Set a row (i.e a constraint) of the LP
  1174 
  1175     ///\param r is the row to be modified
  1176     ///\param c is a linear expression (see \ref Constr)
  1177     void row(Row r, const Constr &c) {
  1178       row(r, c.lowerBounded()?c.lowerBound():-INF,
  1179           c.expr(), c.upperBounded()?c.upperBound():INF);
  1180     }
  1181 
  1182 
  1183     ///Get a row (i.e a constraint) of the LP
  1184 
  1185     ///\param r is the row to get
  1186     ///\return the expression associated to the row
  1187     Expr row(Row r) const {
  1188       Expr e;
  1189       _getRowCoeffs(rows(id(r)), InsertIterator(e.comps, cols));
  1190       return e;
  1191     }
  1192 
  1193     ///Add a new row (i.e a new constraint) to the LP
  1194 
  1195     ///\param l is the lower bound (-\ref INF means no bound)
  1196     ///\param e is a linear expression (see \ref Expr)
  1197     ///\param u is the upper bound (\ref INF means no bound)
  1198     ///\return The created row.
  1199     Row addRow(Value l,const Expr &e, Value u) {
  1200       Row r=addRow();
  1201       row(r,l,e,u);
  1202       return r;
  1203     }
  1204 
  1205     ///Add a new row (i.e a new constraint) to the LP
  1206 
  1207     ///\param c is a linear expression (see \ref Constr)
  1208     ///\return The created row.
  1209     Row addRow(const Constr &c) {
  1210       Row r=addRow();
  1211       row(r,c);
  1212       return r;
  1213     }
  1214     ///Erase a column (i.e a variable) from the LP
  1215 
  1216     ///\param c is the column to be deleted
  1217     void erase(Col c) {
  1218       _eraseCol(cols(id(c)));
  1219       _eraseColId(cols(id(c)));
  1220     }
  1221     ///Erase a row (i.e a constraint) from the LP
  1222 
  1223     ///\param r is the row to be deleted
  1224     void erase(Row r) {
  1225       _eraseRow(rows(id(r)));
  1226       _eraseRowId(rows(id(r)));
  1227     }
  1228 
  1229     /// Get the name of a column
  1230 
  1231     ///\param c is the coresponding column
  1232     ///\return The name of the colunm
  1233     std::string colName(Col c) const {
  1234       std::string name;
  1235       _getColName(cols(id(c)), name);
  1236       return name;
  1237     }
  1238 
  1239     /// Set the name of a column
  1240 
  1241     ///\param c is the coresponding column
  1242     ///\param name The name to be given
  1243     void colName(Col c, const std::string& name) {
  1244       _setColName(cols(id(c)), name);
  1245     }
  1246 
  1247     /// Get the column by its name
  1248 
  1249     ///\param name The name of the column
  1250     ///\return the proper column or \c INVALID
  1251     Col colByName(const std::string& name) const {
  1252       int k = _colByName(name);
  1253       return k != -1 ? Col(cols[k]) : Col(INVALID);
  1254     }
  1255 
  1256     /// Get the name of a row
  1257 
  1258     ///\param r is the coresponding row
  1259     ///\return The name of the row
  1260     std::string rowName(Row r) const {
  1261       std::string name;
  1262       _getRowName(rows(id(r)), name);
  1263       return name;
  1264     }
  1265 
  1266     /// Set the name of a row
  1267 
  1268     ///\param r is the coresponding row
  1269     ///\param name The name to be given
  1270     void rowName(Row r, const std::string& name) {
  1271       _setRowName(rows(id(r)), name);
  1272     }
  1273 
  1274     /// Get the row by its name
  1275 
  1276     ///\param name The name of the row
  1277     ///\return the proper row or \c INVALID
  1278     Row rowByName(const std::string& name) const {
  1279       int k = _rowByName(name);
  1280       return k != -1 ? Row(rows[k]) : Row(INVALID);
  1281     }
  1282 
  1283     /// Set an element of the coefficient matrix of the LP
  1284 
  1285     ///\param r is the row of the element to be modified
  1286     ///\param c is the column of the element to be modified
  1287     ///\param val is the new value of the coefficient
  1288     void coeff(Row r, Col c, Value val) {
  1289       _setCoeff(rows(id(r)),cols(id(c)), val);
  1290     }
  1291 
  1292     /// Get an element of the coefficient matrix of the LP
  1293 
  1294     ///\param r is the row of the element
  1295     ///\param c is the column of the element
  1296     ///\return the corresponding coefficient
  1297     Value coeff(Row r, Col c) const {
  1298       return _getCoeff(rows(id(r)),cols(id(c)));
  1299     }
  1300 
  1301     /// Set the lower bound of a column (i.e a variable)
  1302 
  1303     /// The lower bound of a variable (column) has to be given by an
  1304     /// extended number of type Value, i.e. a finite number of type
  1305     /// Value or -\ref INF.
  1306     void colLowerBound(Col c, Value value) {
  1307       _setColLowerBound(cols(id(c)),value);
  1308     }
  1309 
  1310     /// Get the lower bound of a column (i.e a variable)
  1311 
  1312     /// This function returns the lower bound for column (variable) \c c
  1313     /// (this might be -\ref INF as well).
  1314     ///\return The lower bound for column \c c
  1315     Value colLowerBound(Col c) const {
  1316       return _getColLowerBound(cols(id(c)));
  1317     }
  1318 
  1319     ///\brief Set the lower bound of  several columns
  1320     ///(i.e variables) at once
  1321     ///
  1322     ///This magic function takes a container as its argument
  1323     ///and applies the function on all of its elements.
  1324     ///The lower bound of a variable (column) has to be given by an
  1325     ///extended number of type Value, i.e. a finite number of type
  1326     ///Value or -\ref INF.
  1327 #ifdef DOXYGEN
  1328     template<class T>
  1329     void colLowerBound(T &t, Value value) { return 0;}
  1330 #else
  1331     template<class T>
  1332     typename enable_if<typename T::value_type::LpCol,void>::type
  1333     colLowerBound(T &t, Value value,dummy<0> = 0) {
  1334       for(typename T::iterator i=t.begin();i!=t.end();++i) {
  1335         colLowerBound(*i, value);
  1336       }
  1337     }
  1338     template<class T>
  1339     typename enable_if<typename T::value_type::second_type::LpCol,
  1340                        void>::type
  1341     colLowerBound(T &t, Value value,dummy<1> = 1) {
  1342       for(typename T::iterator i=t.begin();i!=t.end();++i) {
  1343         colLowerBound(i->second, value);
  1344       }
  1345     }
  1346     template<class T>
  1347     typename enable_if<typename T::MapIt::Value::LpCol,
  1348                        void>::type
  1349     colLowerBound(T &t, Value value,dummy<2> = 2) {
  1350       for(typename T::MapIt i(t); i!=INVALID; ++i){
  1351         colLowerBound(*i, value);
  1352       }
  1353     }
  1354 #endif
  1355 
  1356     /// Set the upper bound of a column (i.e a variable)
  1357 
  1358     /// The upper bound of a variable (column) has to be given by an
  1359     /// extended number of type Value, i.e. a finite number of type
  1360     /// Value or \ref INF.
  1361     void colUpperBound(Col c, Value value) {
  1362       _setColUpperBound(cols(id(c)),value);
  1363     };
  1364 
  1365     /// Get the upper bound of a column (i.e a variable)
  1366 
  1367     /// This function returns the upper bound for column (variable) \c c
  1368     /// (this might be \ref INF as well).
  1369     /// \return The upper bound for column \c c
  1370     Value colUpperBound(Col c) const {
  1371       return _getColUpperBound(cols(id(c)));
  1372     }
  1373 
  1374     ///\brief Set the upper bound of  several columns
  1375     ///(i.e variables) at once
  1376     ///
  1377     ///This magic function takes a container as its argument
  1378     ///and applies the function on all of its elements.
  1379     ///The upper bound of a variable (column) has to be given by an
  1380     ///extended number of type Value, i.e. a finite number of type
  1381     ///Value or \ref INF.
  1382 #ifdef DOXYGEN
  1383     template<class T>
  1384     void colUpperBound(T &t, Value value) { return 0;}
  1385 #else
  1386     template<class T1>
  1387     typename enable_if<typename T1::value_type::LpCol,void>::type
  1388     colUpperBound(T1 &t, Value value,dummy<0> = 0) {
  1389       for(typename T1::iterator i=t.begin();i!=t.end();++i) {
  1390         colUpperBound(*i, value);
  1391       }
  1392     }
  1393     template<class T1>
  1394     typename enable_if<typename T1::value_type::second_type::LpCol,
  1395                        void>::type
  1396     colUpperBound(T1 &t, Value value,dummy<1> = 1) {
  1397       for(typename T1::iterator i=t.begin();i!=t.end();++i) {
  1398         colUpperBound(i->second, value);
  1399       }
  1400     }
  1401     template<class T1>
  1402     typename enable_if<typename T1::MapIt::Value::LpCol,
  1403                        void>::type
  1404     colUpperBound(T1 &t, Value value,dummy<2> = 2) {
  1405       for(typename T1::MapIt i(t); i!=INVALID; ++i){
  1406         colUpperBound(*i, value);
  1407       }
  1408     }
  1409 #endif
  1410 
  1411     /// Set the lower and the upper bounds of a column (i.e a variable)
  1412 
  1413     /// The lower and the upper bounds of
  1414     /// a variable (column) have to be given by an
  1415     /// extended number of type Value, i.e. a finite number of type
  1416     /// Value, -\ref INF or \ref INF.
  1417     void colBounds(Col c, Value lower, Value upper) {
  1418       _setColLowerBound(cols(id(c)),lower);
  1419       _setColUpperBound(cols(id(c)),upper);
  1420     }
  1421 
  1422     ///\brief Set the lower and the upper bound of several columns
  1423     ///(i.e variables) at once
  1424     ///
  1425     ///This magic function takes a container as its argument
  1426     ///and applies the function on all of its elements.
  1427     /// The lower and the upper bounds of
  1428     /// a variable (column) have to be given by an
  1429     /// extended number of type Value, i.e. a finite number of type
  1430     /// Value, -\ref INF or \ref INF.
  1431 #ifdef DOXYGEN
  1432     template<class T>
  1433     void colBounds(T &t, Value lower, Value upper) { return 0;}
  1434 #else
  1435     template<class T2>
  1436     typename enable_if<typename T2::value_type::LpCol,void>::type
  1437     colBounds(T2 &t, Value lower, Value upper,dummy<0> = 0) {
  1438       for(typename T2::iterator i=t.begin();i!=t.end();++i) {
  1439         colBounds(*i, lower, upper);
  1440       }
  1441     }
  1442     template<class T2>
  1443     typename enable_if<typename T2::value_type::second_type::LpCol, void>::type
  1444     colBounds(T2 &t, Value lower, Value upper,dummy<1> = 1) {
  1445       for(typename T2::iterator i=t.begin();i!=t.end();++i) {
  1446         colBounds(i->second, lower, upper);
  1447       }
  1448     }
  1449     template<class T2>
  1450     typename enable_if<typename T2::MapIt::Value::LpCol, void>::type
  1451     colBounds(T2 &t, Value lower, Value upper,dummy<2> = 2) {
  1452       for(typename T2::MapIt i(t); i!=INVALID; ++i){
  1453         colBounds(*i, lower, upper);
  1454       }
  1455     }
  1456 #endif
  1457 
  1458     /// Set the lower bound of a row (i.e a constraint)
  1459 
  1460     /// The lower bound of a constraint (row) has to be given by an
  1461     /// extended number of type Value, i.e. a finite number of type
  1462     /// Value or -\ref INF.
  1463     void rowLowerBound(Row r, Value value) {
  1464       _setRowLowerBound(rows(id(r)),value);
  1465     }
  1466 
  1467     /// Get the lower bound of a row (i.e a constraint)
  1468 
  1469     /// This function returns the lower bound for row (constraint) \c c
  1470     /// (this might be -\ref INF as well).
  1471     ///\return The lower bound for row \c r
  1472     Value rowLowerBound(Row r) const {
  1473       return _getRowLowerBound(rows(id(r)));
  1474     }
  1475 
  1476     /// Set the upper bound of a row (i.e a constraint)
  1477 
  1478     /// The upper bound of a constraint (row) has to be given by an
  1479     /// extended number of type Value, i.e. a finite number of type
  1480     /// Value or -\ref INF.
  1481     void rowUpperBound(Row r, Value value) {
  1482       _setRowUpperBound(rows(id(r)),value);
  1483     }
  1484 
  1485     /// Get the upper bound of a row (i.e a constraint)
  1486 
  1487     /// This function returns the upper bound for row (constraint) \c c
  1488     /// (this might be -\ref INF as well).
  1489     ///\return The upper bound for row \c r
  1490     Value rowUpperBound(Row r) const {
  1491       return _getRowUpperBound(rows(id(r)));
  1492     }
  1493 
  1494     ///Set an element of the objective function
  1495     void objCoeff(Col c, Value v) {_setObjCoeff(cols(id(c)),v); };
  1496 
  1497     ///Get an element of the objective function
  1498     Value objCoeff(Col c) const { return _getObjCoeff(cols(id(c))); };
  1499 
  1500     ///Set the objective function
  1501 
  1502     ///\param e is a linear expression of type \ref Expr.
  1503     ///
  1504     void obj(const Expr& e) {
  1505       _setObjCoeffs(ExprIterator(e.comps.begin(), cols),
  1506                     ExprIterator(e.comps.end(), cols));
  1507       obj_const_comp = *e;
  1508     }
  1509 
  1510     ///Get the objective function
  1511 
  1512     ///\return the objective function as a linear expression of type
  1513     ///Expr.
  1514     Expr obj() const {
  1515       Expr e;
  1516       _getObjCoeffs(InsertIterator(e.comps, cols));
  1517       *e = obj_const_comp;
  1518       return e;
  1519     }
  1520 
  1521 
  1522     ///Set the direction of optimization
  1523     void sense(Sense sense) { _setSense(sense); }
  1524 
  1525     ///Query the direction of the optimization
  1526     Sense sense() const {return _getSense(); }
  1527 
  1528     ///Set the sense to maximization
  1529     void max() { _setSense(MAX); }
  1530 
  1531     ///Set the sense to maximization
  1532     void min() { _setSense(MIN); }
  1533 
  1534     ///Clears the problem
  1535     void clear() { _clear(); }
  1536 
  1537     ///@}
  1538 
  1539   };
  1540 
  1541   /// Addition
  1542 
  1543   ///\relates LpBase::Expr
  1544   ///
  1545   inline LpBase::Expr operator+(const LpBase::Expr &a, const LpBase::Expr &b) {
  1546     LpBase::Expr tmp(a);
  1547     tmp+=b;
  1548     return tmp;
  1549   }
  1550   ///Substraction
  1551 
  1552   ///\relates LpBase::Expr
  1553   ///
  1554   inline LpBase::Expr operator-(const LpBase::Expr &a, const LpBase::Expr &b) {
  1555     LpBase::Expr tmp(a);
  1556     tmp-=b;
  1557     return tmp;
  1558   }
  1559   ///Multiply with constant
  1560 
  1561   ///\relates LpBase::Expr
  1562   ///
  1563   inline LpBase::Expr operator*(const LpBase::Expr &a, const LpBase::Value &b) {
  1564     LpBase::Expr tmp(a);
  1565     tmp*=b;
  1566     return tmp;
  1567   }
  1568 
  1569   ///Multiply with constant
  1570 
  1571   ///\relates LpBase::Expr
  1572   ///
  1573   inline LpBase::Expr operator*(const LpBase::Value &a, const LpBase::Expr &b) {
  1574     LpBase::Expr tmp(b);
  1575     tmp*=a;
  1576     return tmp;
  1577   }
  1578   ///Divide with constant
  1579 
  1580   ///\relates LpBase::Expr
  1581   ///
  1582   inline LpBase::Expr operator/(const LpBase::Expr &a, const LpBase::Value &b) {
  1583     LpBase::Expr tmp(a);
  1584     tmp/=b;
  1585     return tmp;
  1586   }
  1587 
  1588   ///Create constraint
  1589 
  1590   ///\relates LpBase::Constr
  1591   ///
  1592   inline LpBase::Constr operator<=(const LpBase::Expr &e,
  1593                                    const LpBase::Expr &f) {
  1594     return LpBase::Constr(0, f - e, LpBase::INF);
  1595   }
  1596 
  1597   ///Create constraint
  1598 
  1599   ///\relates LpBase::Constr
  1600   ///
  1601   inline LpBase::Constr operator<=(const LpBase::Value &e,
  1602                                    const LpBase::Expr &f) {
  1603     return LpBase::Constr(e, f, LpBase::NaN);
  1604   }
  1605 
  1606   ///Create constraint
  1607 
  1608   ///\relates LpBase::Constr
  1609   ///
  1610   inline LpBase::Constr operator<=(const LpBase::Expr &e,
  1611                                    const LpBase::Value &f) {
  1612     return LpBase::Constr(- LpBase::INF, e, f);
  1613   }
  1614 
  1615   ///Create constraint
  1616 
  1617   ///\relates LpBase::Constr
  1618   ///
  1619   inline LpBase::Constr operator>=(const LpBase::Expr &e,
  1620                                    const LpBase::Expr &f) {
  1621     return LpBase::Constr(0, e - f, LpBase::INF);
  1622   }
  1623 
  1624 
  1625   ///Create constraint
  1626 
  1627   ///\relates LpBase::Constr
  1628   ///
  1629   inline LpBase::Constr operator>=(const LpBase::Value &e,
  1630                                    const LpBase::Expr &f) {
  1631     return LpBase::Constr(LpBase::NaN, f, e);
  1632   }
  1633 
  1634 
  1635   ///Create constraint
  1636 
  1637   ///\relates LpBase::Constr
  1638   ///
  1639   inline LpBase::Constr operator>=(const LpBase::Expr &e,
  1640                                    const LpBase::Value &f) {
  1641     return LpBase::Constr(f, e, LpBase::INF);
  1642   }
  1643 
  1644   ///Create constraint
  1645 
  1646   ///\relates LpBase::Constr
  1647   ///
  1648   inline LpBase::Constr operator==(const LpBase::Expr &e,
  1649                                    const LpBase::Value &f) {
  1650     return LpBase::Constr(f, e, f);
  1651   }
  1652 
  1653   ///Create constraint
  1654 
  1655   ///\relates LpBase::Constr
  1656   ///
  1657   inline LpBase::Constr operator==(const LpBase::Expr &e,
  1658                                    const LpBase::Expr &f) {
  1659     return LpBase::Constr(0, f - e, 0);
  1660   }
  1661 
  1662   ///Create constraint
  1663 
  1664   ///\relates LpBase::Constr
  1665   ///
  1666   inline LpBase::Constr operator<=(const LpBase::Value &n,
  1667                                    const LpBase::Constr &c) {
  1668     LpBase::Constr tmp(c);
  1669     LEMON_ASSERT(isNaN(tmp.lowerBound()), "Wrong LP constraint");
  1670     tmp.lowerBound()=n;
  1671     return tmp;
  1672   }
  1673   ///Create constraint
  1674 
  1675   ///\relates LpBase::Constr
  1676   ///
  1677   inline LpBase::Constr operator<=(const LpBase::Constr &c,
  1678                                    const LpBase::Value &n)
  1679   {
  1680     LpBase::Constr tmp(c);
  1681     LEMON_ASSERT(isNaN(tmp.upperBound()), "Wrong LP constraint");
  1682     tmp.upperBound()=n;
  1683     return tmp;
  1684   }
  1685 
  1686   ///Create constraint
  1687 
  1688   ///\relates LpBase::Constr
  1689   ///
  1690   inline LpBase::Constr operator>=(const LpBase::Value &n,
  1691                                    const LpBase::Constr &c) {
  1692     LpBase::Constr tmp(c);
  1693     LEMON_ASSERT(isNaN(tmp.upperBound()), "Wrong LP constraint");
  1694     tmp.upperBound()=n;
  1695     return tmp;
  1696   }
  1697   ///Create constraint
  1698 
  1699   ///\relates LpBase::Constr
  1700   ///
  1701   inline LpBase::Constr operator>=(const LpBase::Constr &c,
  1702                                    const LpBase::Value &n)
  1703   {
  1704     LpBase::Constr tmp(c);
  1705     LEMON_ASSERT(isNaN(tmp.lowerBound()), "Wrong LP constraint");
  1706     tmp.lowerBound()=n;
  1707     return tmp;
  1708   }
  1709 
  1710   ///Addition
  1711 
  1712   ///\relates LpBase::DualExpr
  1713   ///
  1714   inline LpBase::DualExpr operator+(const LpBase::DualExpr &a,
  1715                                     const LpBase::DualExpr &b) {
  1716     LpBase::DualExpr tmp(a);
  1717     tmp+=b;
  1718     return tmp;
  1719   }
  1720   ///Substraction
  1721 
  1722   ///\relates LpBase::DualExpr
  1723   ///
  1724   inline LpBase::DualExpr operator-(const LpBase::DualExpr &a,
  1725                                     const LpBase::DualExpr &b) {
  1726     LpBase::DualExpr tmp(a);
  1727     tmp-=b;
  1728     return tmp;
  1729   }
  1730   ///Multiply with constant
  1731 
  1732   ///\relates LpBase::DualExpr
  1733   ///
  1734   inline LpBase::DualExpr operator*(const LpBase::DualExpr &a,
  1735                                     const LpBase::Value &b) {
  1736     LpBase::DualExpr tmp(a);
  1737     tmp*=b;
  1738     return tmp;
  1739   }
  1740 
  1741   ///Multiply with constant
  1742 
  1743   ///\relates LpBase::DualExpr
  1744   ///
  1745   inline LpBase::DualExpr operator*(const LpBase::Value &a,
  1746                                     const LpBase::DualExpr &b) {
  1747     LpBase::DualExpr tmp(b);
  1748     tmp*=a;
  1749     return tmp;
  1750   }
  1751   ///Divide with constant
  1752 
  1753   ///\relates LpBase::DualExpr
  1754   ///
  1755   inline LpBase::DualExpr operator/(const LpBase::DualExpr &a,
  1756                                     const LpBase::Value &b) {
  1757     LpBase::DualExpr tmp(a);
  1758     tmp/=b;
  1759     return tmp;
  1760   }
  1761 
  1762   /// \ingroup lp_group
  1763   ///
  1764   /// \brief Common base class for LP solvers
  1765   ///
  1766   /// This class is an abstract base class for LP solvers. This class
  1767   /// provides a full interface for set and modify an LP problem,
  1768   /// solve it and retrieve the solution. You can use one of the
  1769   /// descendants as a concrete implementation, or the \c Lp
  1770   /// default LP solver. However, if you would like to handle LP
  1771   /// solvers as reference or pointer in a generic way, you can use
  1772   /// this class directly.
  1773   class LpSolver : virtual public LpBase {
  1774   public:
  1775 
  1776     /// The problem types for primal and dual problems
  1777     enum ProblemType {
  1778       ///Feasible solution hasn't been found (but may exist).
  1779       UNDEFINED = 0,
  1780       ///The problem has no feasible solution
  1781       INFEASIBLE = 1,
  1782       ///Feasible solution found
  1783       FEASIBLE = 2,
  1784       ///Optimal solution exists and found
  1785       OPTIMAL = 3,
  1786       ///The cost function is unbounded
  1787       UNBOUNDED = 4
  1788     };
  1789 
  1790     ///The basis status of variables
  1791     enum VarStatus {
  1792       /// The variable is in the basis
  1793       BASIC, 
  1794       /// The variable is free, but not basic
  1795       FREE,
  1796       /// The variable has active lower bound 
  1797       LOWER,
  1798       /// The variable has active upper bound
  1799       UPPER,
  1800       /// The variable is non-basic and fixed
  1801       FIXED
  1802     };
  1803 
  1804   protected:
  1805 
  1806     virtual SolveExitStatus _solve() = 0;
  1807 
  1808     virtual Value _getPrimal(int i) const = 0;
  1809     virtual Value _getDual(int i) const = 0;
  1810 
  1811     virtual Value _getPrimalRay(int i) const = 0;
  1812     virtual Value _getDualRay(int i) const = 0;
  1813 
  1814     virtual Value _getPrimalValue() const = 0;
  1815 
  1816     virtual VarStatus _getColStatus(int i) const = 0;
  1817     virtual VarStatus _getRowStatus(int i) const = 0;
  1818 
  1819     virtual ProblemType _getPrimalType() const = 0;
  1820     virtual ProblemType _getDualType() const = 0;
  1821 
  1822   public:
  1823 
  1824     ///\name Solve the LP
  1825 
  1826     ///@{
  1827 
  1828     ///\e Solve the LP problem at hand
  1829     ///
  1830     ///\return The result of the optimization procedure. Possible
  1831     ///values and their meanings can be found in the documentation of
  1832     ///\ref SolveExitStatus.
  1833     SolveExitStatus solve() { return _solve(); }
  1834 
  1835     ///@}
  1836 
  1837     ///\name Obtain the solution
  1838 
  1839     ///@{
  1840 
  1841     /// The type of the primal problem
  1842     ProblemType primalType() const {
  1843       return _getPrimalType();
  1844     }
  1845 
  1846     /// The type of the dual problem
  1847     ProblemType dualType() const {
  1848       return _getDualType();
  1849     }
  1850 
  1851     /// Return the primal value of the column
  1852 
  1853     /// Return the primal value of the column.
  1854     /// \pre The problem is solved.
  1855     Value primal(Col c) const { return _getPrimal(cols(id(c))); }
  1856 
  1857     /// Return the primal value of the expression
  1858 
  1859     /// Return the primal value of the expression, i.e. the dot
  1860     /// product of the primal solution and the expression.
  1861     /// \pre The problem is solved.
  1862     Value primal(const Expr& e) const {
  1863       double res = *e;
  1864       for (Expr::ConstCoeffIt c(e); c != INVALID; ++c) {
  1865         res += *c * primal(c);
  1866       }
  1867       return res;
  1868     }
  1869     /// Returns a component of the primal ray
  1870     
  1871     /// The primal ray is solution of the modified primal problem,
  1872     /// where we change each finite bound to 0, and we looking for a
  1873     /// negative objective value in case of minimization, and positive
  1874     /// objective value for maximization. If there is such solution,
  1875     /// that proofs the unsolvability of the dual problem, and if a
  1876     /// feasible primal solution exists, then the unboundness of
  1877     /// primal problem.
  1878     ///
  1879     /// \pre The problem is solved and the dual problem is infeasible.
  1880     /// \note Some solvers does not provide primal ray calculation
  1881     /// functions.
  1882     Value primalRay(Col c) const { return _getPrimalRay(cols(id(c))); }
  1883 
  1884     /// Return the dual value of the row
  1885 
  1886     /// Return the dual value of the row.
  1887     /// \pre The problem is solved.
  1888     Value dual(Row r) const { return _getDual(rows(id(r))); }
  1889 
  1890     /// Return the dual value of the dual expression
  1891 
  1892     /// Return the dual value of the dual expression, i.e. the dot
  1893     /// product of the dual solution and the dual expression.
  1894     /// \pre The problem is solved.
  1895     Value dual(const DualExpr& e) const {
  1896       double res = 0.0;
  1897       for (DualExpr::ConstCoeffIt r(e); r != INVALID; ++r) {
  1898         res += *r * dual(r);
  1899       }
  1900       return res;
  1901     }
  1902 
  1903     /// Returns a component of the dual ray
  1904     
  1905     /// The dual ray is solution of the modified primal problem, where
  1906     /// we change each finite bound to 0 (i.e. the objective function
  1907     /// coefficients in the primal problem), and we looking for a
  1908     /// ositive objective value. If there is such solution, that
  1909     /// proofs the unsolvability of the primal problem, and if a
  1910     /// feasible dual solution exists, then the unboundness of
  1911     /// dual problem.
  1912     ///
  1913     /// \pre The problem is solved and the primal problem is infeasible.
  1914     /// \note Some solvers does not provide dual ray calculation
  1915     /// functions.
  1916     Value dualRay(Row r) const { return _getDualRay(rows(id(r))); }
  1917 
  1918     /// Return the basis status of the column
  1919 
  1920     /// \see VarStatus
  1921     VarStatus colStatus(Col c) const { return _getColStatus(cols(id(c))); }
  1922 
  1923     /// Return the basis status of the row
  1924 
  1925     /// \see VarStatus
  1926     VarStatus rowStatus(Row r) const { return _getRowStatus(rows(id(r))); }
  1927 
  1928     ///The value of the objective function
  1929 
  1930     ///\return
  1931     ///- \ref INF or -\ref INF means either infeasibility or unboundedness
  1932     /// of the primal problem, depending on whether we minimize or maximize.
  1933     ///- \ref NaN if no primal solution is found.
  1934     ///- The (finite) objective value if an optimal solution is found.
  1935     Value primal() const { return _getPrimalValue()+obj_const_comp;}
  1936     ///@}
  1937 
  1938     LpSolver* newSolver() {return _newSolver();}
  1939     LpSolver* cloneSolver() {return _cloneSolver();}
  1940 
  1941   protected:
  1942 
  1943     virtual LpSolver* _newSolver() const = 0;
  1944     virtual LpSolver* _cloneSolver() const = 0;
  1945   };
  1946 
  1947 
  1948   /// \ingroup lp_group
  1949   ///
  1950   /// \brief Common base class for MIP solvers
  1951   ///
  1952   /// This class is an abstract base class for MIP solvers. This class
  1953   /// provides a full interface for set and modify an MIP problem,
  1954   /// solve it and retrieve the solution. You can use one of the
  1955   /// descendants as a concrete implementation, or the \c Lp
  1956   /// default MIP solver. However, if you would like to handle MIP
  1957   /// solvers as reference or pointer in a generic way, you can use
  1958   /// this class directly.
  1959   class MipSolver : virtual public LpBase {
  1960   public:
  1961 
  1962     /// The problem types for MIP problems
  1963     enum ProblemType {
  1964       ///Feasible solution hasn't been found (but may exist).
  1965       UNDEFINED = 0,
  1966       ///The problem has no feasible solution
  1967       INFEASIBLE = 1,
  1968       ///Feasible solution found
  1969       FEASIBLE = 2,
  1970       ///Optimal solution exists and found
  1971       OPTIMAL = 3,
  1972       ///The cost function is unbounded
  1973       ///
  1974       ///The Mip or at least the relaxed problem is unbounded
  1975       UNBOUNDED = 4
  1976     };
  1977 
  1978     ///\name Solve the MIP
  1979 
  1980     ///@{
  1981 
  1982     /// Solve the MIP problem at hand
  1983     ///
  1984     ///\return The result of the optimization procedure. Possible
  1985     ///values and their meanings can be found in the documentation of
  1986     ///\ref SolveExitStatus.
  1987     SolveExitStatus solve() { return _solve(); }
  1988 
  1989     ///@}
  1990 
  1991     ///\name Setting column type
  1992     ///@{
  1993 
  1994     ///Possible variable (column) types (e.g. real, integer, binary etc.)
  1995     enum ColTypes {
  1996       ///Continuous variable (default)
  1997       REAL = 0,
  1998       ///Integer variable
  1999       INTEGER = 1
  2000     };
  2001 
  2002     ///Sets the type of the given column to the given type
  2003 
  2004     ///Sets the type of the given column to the given type.
  2005     ///
  2006     void colType(Col c, ColTypes col_type) {
  2007       _setColType(cols(id(c)),col_type);
  2008     }
  2009 
  2010     ///Gives back the type of the column.
  2011 
  2012     ///Gives back the type of the column.
  2013     ///
  2014     ColTypes colType(Col c) const {
  2015       return _getColType(cols(id(c)));
  2016     }
  2017     ///@}
  2018 
  2019     ///\name Obtain the solution
  2020 
  2021     ///@{
  2022 
  2023     /// The type of the MIP problem
  2024     ProblemType type() const {
  2025       return _getType();
  2026     }
  2027 
  2028     /// Return the value of the row in the solution
  2029 
  2030     ///  Return the value of the row in the solution.
  2031     /// \pre The problem is solved.
  2032     Value sol(Col c) const { return _getSol(cols(id(c))); }
  2033 
  2034     /// Return the value of the expression in the solution
  2035 
  2036     /// Return the value of the expression in the solution, i.e. the
  2037     /// dot product of the solution and the expression.
  2038     /// \pre The problem is solved.
  2039     Value sol(const Expr& e) const {
  2040       double res = *e;
  2041       for (Expr::ConstCoeffIt c(e); c != INVALID; ++c) {
  2042         res += *c * sol(c);
  2043       }
  2044       return res;
  2045     }
  2046     ///The value of the objective function
  2047     
  2048     ///\return
  2049     ///- \ref INF or -\ref INF means either infeasibility or unboundedness
  2050     /// of the problem, depending on whether we minimize or maximize.
  2051     ///- \ref NaN if no primal solution is found.
  2052     ///- The (finite) objective value if an optimal solution is found.
  2053     Value solValue() const { return _getSolValue()+obj_const_comp;}
  2054     ///@}
  2055 
  2056   protected:
  2057 
  2058     virtual SolveExitStatus _solve() = 0;
  2059     virtual ColTypes _getColType(int col) const = 0;
  2060     virtual void _setColType(int col, ColTypes col_type) = 0;
  2061     virtual ProblemType _getType() const = 0;
  2062     virtual Value _getSol(int i) const = 0;
  2063     virtual Value _getSolValue() const = 0;
  2064 
  2065   public:
  2066 
  2067     MipSolver* newSolver() {return _newSolver();}
  2068     MipSolver* cloneSolver() {return _cloneSolver();}
  2069 
  2070   protected:
  2071 
  2072     virtual MipSolver* _newSolver() const = 0;
  2073     virtual MipSolver* _cloneSolver() const = 0;
  2074   };
  2075 
  2076 
  2077 
  2078 } //namespace lemon
  2079 
  2080 #endif //LEMON_LP_BASE_H