LEMON/LEMON-official Changeset - r755:5d313b76f323

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Changeset - r755:5d313b76f323

« 754:3887d6
« 747:6f7c10

759:6d5f54 »

r755:5d313b76f323

Mon, 31 Aug 2009 10:03:23

[Not Reviewed]

0 comments (0 inline)

alpar (Alpar Juttner)
alpar@cs.elte.hu

Merge

0 2 4

merge default

1 file changed with 1678 insertions and 9 deletions:

lemon/binom_heap.h

445

lemon/fourary_heap.h

342

lemon/kary_heap.h

352

lemon/pairing_heap.h

474

lemon/Makefile.am

test/heap_test.cc

↑ Collapse diff ↑

lemon/binom_heap.h

Show inline comments

 		/* -*- mode: C++; indent-tabs-mode: nil; -*-
+		 *
 		 * This file is a part of LEMON, a generic C++ optimization library.
+		 *
 		 * Copyright (C) 2003-2009
 		 * 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_BINOM_HEAP_H
 		#define LEMON_BINOM_HEAP_H
 		///\file
 		///\ingroup heaps
 		///\brief Binomial Heap implementation.
 		#include <vector>
 		#include <utility>
 		#include <functional>
 		#include <lemon/math.h>
 		#include <lemon/counter.h>
 		namespace lemon {
 		  /// \ingroup heaps
 		  ///
 		  ///\brief Binomial heap data structure.
 		  ///
 		  /// This class implements the \e binomial \e heap data structure.
 		  /// It fully conforms to the \ref concepts::Heap "heap concept".
 		  ///
 		  /// The methods \ref increase() and \ref erase() are not efficient
 		  /// in a binomial heap. In case of many calls of these operations,
 		  /// it is better to use other heap structure, e.g. \ref BinHeap
 		  /// "binary heap".
 		  ///
 		  /// \tparam PR Type of the priorities of the items.
 		  /// \tparam IM A read-writable item map with \c int values, used
 		  /// internally to handle the cross references.
 		  /// \tparam CMP A functor class for comparing the priorities.
 		  /// The default is \c std::less<PR>.
 		#ifdef DOXYGEN
 		  template <typename PR, typename IM, typename CMP>
 		#else
 		  template <typename PR, typename IM, typename CMP = std::less<PR> >
 		#endif
 		  class BinomHeap {
 		  public:
 		    /// Type of the item-int map.
 		    typedef IM ItemIntMap;
 		    /// Type of the priorities.
 		    typedef PR Prio;
 		    /// Type of the items stored in the heap.
 		    typedef typename ItemIntMap::Key Item;
 		    /// Functor type for comparing the priorities.
 		    typedef CMP Compare;
 		    /// \brief Type to represent the states of the items.
 		    ///
 		    /// Each item has a state associated to it. It can be "in heap",
 		    /// "pre-heap" or "post-heap". The latter two are indifferent from the
 		    /// heap's point of view, but may be useful to the user.
 		    ///
 		    /// The item-int map must be initialized in such way that it assigns
 		    /// \c PRE_HEAP (<tt>-1</tt>) to any element to be put in the heap.
 		    enum State {
 		      IN_HEAP = 0,    ///< = 0.
 		      PRE_HEAP = -1,  ///< = -1.
 		      POST_HEAP = -2  ///< = -2.
 		    };
 		  private:
 		    class Store;
 		    std::vector<Store> _data;
 		    int _min, _head;
 		    ItemIntMap &_iim;
 		    Compare _comp;
 		    int _num_items;
 		  public:
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    explicit BinomHeap(ItemIntMap &map)
 		      : _min(0), _head(-1), _iim(map), _num_items(0) {}
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    /// \param comp The function object used for comparing the priorities.
 		    BinomHeap(ItemIntMap &map, const Compare &comp)
 		      : _min(0), _head(-1), _iim(map), _comp(comp), _num_items(0) {}
 		    /// \brief The number of items stored in the heap.
 		    ///
 		    /// This function returns the number of items stored in the heap.
 		    int size() const { return _num_items; }
 		    /// \brief Check if the heap is empty.
 		    ///
 		    /// This function returns \c true if the heap is empty.
 		    bool empty() const { return _num_items==0; }
 		    /// \brief Make the heap empty.
 		    ///
 		    /// This functon makes the heap empty.
 		    /// It does not change the cross reference map. If you want to reuse
 		    /// a heap that is not surely empty, you should first clear it and
 		    /// then you should set the cross reference map to \c PRE_HEAP
 		    /// for each item.
 		    void clear() {
 		      _data.clear(); _min=0; _num_items=0; _head=-1;
+		    }
 		    /// \brief Set the priority of an item or insert it, if it is
 		    /// not stored in the heap.
 		    ///
 		    /// This method sets the priority of the given item if it is
 		    /// already stored in the heap. Otherwise it inserts the given
 		    /// item into the heap with the given priority.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    void set (const Item& item, const Prio& value) {
 		      int i=_iim[item];
 		      if ( i >= 0 && _data[i].in ) {
 		        if ( _comp(value, _data[i].prio) ) decrease(item, value);
 		        if ( _comp(_data[i].prio, value) ) increase(item, value);
 		      } else push(item, value);
+		    }
 		    /// \brief Insert an item into the heap with the given priority.
 		    ///
 		    /// This function inserts the given item into the heap with the
 		    /// given priority.
 		    /// \param item The item to insert.
 		    /// \param value The priority of the item.
 		    /// \pre \e item must not be stored in the heap.
 		    void push (const Item& item, const Prio& value) {
 		      int i=_iim[item];
 		      if ( i<0 ) {
 		        int s=_data.size();
 		        _iim.set( item,s );
 		        Store st;
 		        st.name=item;
 		        st.prio=value;
 		        _data.push_back(st);
 		        i=s;
+		      }
 		      else {
 		        _data[i].parent=_data[i].right_neighbor=_data[i].child=-1;
 		        _data[i].degree=0;
 		        _data[i].in=true;
 		        _data[i].prio=value;
+		      }
 		      if( 0==_num_items ) {
 		        _head=i;
 		        _min=i;
 		      } else {
 		        merge(i);
 		        if( _comp(_data[i].prio, _data[_min].prio) ) _min=i;
+		      }
 		      ++_num_items;
+		    }
 		    /// \brief Return the item having minimum priority.
 		    ///
 		    /// This function returns the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Item top() const { return _data[_min].name; }
 		    /// \brief The minimum priority.
 		    ///
 		    /// This function returns the minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Prio prio() const { return _data[_min].prio; }
 		    /// \brief The priority of the given item.
 		    ///
 		    /// This function returns the priority of the given item.
 		    /// \param item The item.
 		    /// \pre \e item must be in the heap.
 		    const Prio& operator[](const Item& item) const {
 		      return _data[_iim[item]].prio;
+		    }
 		    /// \brief Remove the item having minimum priority.
 		    ///
 		    /// This function removes the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    void pop() {
 		      _data[_min].in=false;
 		      int head_child=-1;
 		      if ( _data[_min].child!=-1 ) {
 		        int child=_data[_min].child;
 		        int neighb;
 		        while( child!=-1 ) {
 		          neighb=_data[child].right_neighbor;
 		          _data[child].parent=-1;
 		          _data[child].right_neighbor=head_child;
 		          head_child=child;
 		          child=neighb;
+		        }
+		      }
 		      if ( _data[_head].right_neighbor==-1 ) {
 		        // there was only one root
 		        _head=head_child;
+		      }
 		      else {
 		        // there were more roots
 		        if( _head!=_min )  { unlace(_min); }
 		        else { _head=_data[_head].right_neighbor; }
 		        merge(head_child);
+		      }
 		      _min=findMin();
 		      --_num_items;
+		    }
 		    /// \brief Remove the given item from the heap.
 		    ///
 		    /// This function removes the given item from the heap if it is
 		    /// already stored.
 		    /// \param item The item to delete.
 		    /// \pre \e item must be in the heap.
 		    void erase (const Item& item) {
 		      int i=_iim[item];
 		      if ( i >= 0 && _data[i].in ) {
 		        decrease( item, _data[_min].prio-1 );
 		        pop();
+		      }
+		    }
 		    /// \brief Decrease the priority of an item to the given value.
 		    ///
 		    /// This function decreases the priority of an item to the given value.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    /// \pre \e item must be stored in the heap with priority at least \e value.
 		    void decrease (Item item, const Prio& value) {
 		      int i=_iim[item];
 		      int p=_data[i].parent;
 		      _data[i].prio=value;
 		      while( p!=-1 && _comp(value, _data[p].prio) ) {
 		        _data[i].name=_data[p].name;
 		        _data[i].prio=_data[p].prio;
 		        _data[p].name=item;
 		        _data[p].prio=value;
 		        _iim[_data[i].name]=i;
 		        i=p;
 		        p=_data[p].parent;
+		      }
 		      _iim[item]=i;
 		      if ( _comp(value, _data[_min].prio) ) _min=i;
+		    }
 		    /// \brief Increase the priority of an item to the given value.
 		    ///
 		    /// This function increases the priority of an item to the given value.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    /// \pre \e item must be stored in the heap with priority at most \e value.
 		    void increase (Item item, const Prio& value) {
 		      erase(item);
 		      push(item, value);
+		    }
 		    /// \brief Return the state of an item.
 		    ///
 		    /// This method returns \c PRE_HEAP if the given item has never
 		    /// been in the heap, \c IN_HEAP if it is in the heap at the moment,
 		    /// and \c POST_HEAP otherwise.
 		    /// In the latter case it is possible that the item will get back
 		    /// to the heap again.
 		    /// \param item The item.
 		    State state(const Item &item) const {
 		      int i=_iim[item];
 		      if( i>=0 ) {
 		        if ( _data[i].in ) i=0;
 		        else i=-2;
+		      }
 		      return State(i);
+		    }
 		    /// \brief Set the state of an item in the heap.
 		    ///
 		    /// This function sets the state of the given item in the heap.
 		    /// It can be used to manually clear the heap when it is important
 		    /// to achive better time complexity.
 		    /// \param i The item.
 		    /// \param st The state. It should not be \c IN_HEAP.
 		    void state(const Item& i, State st) {
 		      switch (st) {
 		      case POST_HEAP:
 		      case PRE_HEAP:
 		        if (state(i) == IN_HEAP) {
 		          erase(i);
+		        }
 		        _iim[i] = st;
 		        break;
 		      case IN_HEAP:
 		        break;
+		      }
+		    }
 		  private:
 		    // Find the minimum of the roots
 		    int findMin() {
 		      if( _head!=-1 ) {
 		        int min_loc=_head, min_val=_data[_head].prio;
 		        for( int x=_data[_head].right_neighbor; x!=-1;
 		             x=_data[x].right_neighbor ) {
 		          if( _comp( _data[x].prio,min_val ) ) {
 		            min_val=_data[x].prio;
 		            min_loc=x;
+		          }
+		        }
 		        return min_loc;
+		      }
 		      else return -1;
+		    }
 		    // Merge the heap with another heap starting at the given position
 		    void merge(int a) {
 		      if( _head==-1 || a==-1 ) return;
 		      if( _data[a].right_neighbor==-1 &&
 		          _data[a].degree<=_data[_head].degree ) {
 		        _data[a].right_neighbor=_head;
 		        _head=a;
 		      } else {
 		        interleave(a);
+		      }
 		      if( _data[_head].right_neighbor==-1 ) return;
 		      int x=_head;
 		      int x_prev=-1, x_next=_data[x].right_neighbor;
 		      while( x_next!=-1 ) {
 		        if( _data[x].degree!=_data[x_next].degree ||
 		            ( _data[x_next].right_neighbor!=-1 &&
 		              _data[_data[x_next].right_neighbor].degree==_data[x].degree ) ) {
 		          x_prev=x;
 		          x=x_next;
+		        }
 		        else {
 		          if( _comp(_data[x_next].prio,_data[x].prio) ) {
 		            if( x_prev==-1 ) {
 		              _head=x_next;
 		            } else {
 		              _data[x_prev].right_neighbor=x_next;
+		            }
 		            fuse(x,x_next);
 		            x=x_next;
+		          }
 		          else {
 		            _data[x].right_neighbor=_data[x_next].right_neighbor;
 		            fuse(x_next,x);
+		          }
+		        }
 		        x_next=_data[x].right_neighbor;
+		      }
+		    }
 		    // Interleave the elements of the given list into the list of the roots
 		    void interleave(int a) {
 		      int p=_head, q=a;
 		      int curr=_data.size();
 		      _data.push_back(Store());
 		      while( p!=-1 || q!=-1 ) {
 		        if( q==-1 || ( p!=-1 && _data[p].degree<_data[q].degree ) ) {
 		          _data[curr].right_neighbor=p;
 		          curr=p;
 		          p=_data[p].right_neighbor;
+		        }
 		        else {
 		          _data[curr].right_neighbor=q;
 		          curr=q;
 		          q=_data[q].right_neighbor;
+		        }
+		      }
 		      _head=_data.back().right_neighbor;
 		      _data.pop_back();
+		    }
 		    // Lace node a under node b
 		    void fuse(int a, int b) {
 		      _data[a].parent=b;
 		      _data[a].right_neighbor=_data[b].child;
 		      _data[b].child=a;
 		      ++_data[b].degree;
+		    }
 		    // Unlace node a (if it has siblings)
 		    void unlace(int a) {
 		      int neighb=_data[a].right_neighbor;
 		      int other=_head;
 		      while( _data[other].right_neighbor!=a )
 		        other=_data[other].right_neighbor;
 		      _data[other].right_neighbor=neighb;
+		    }
 		  private:
 		    class Store {
 		      friend class BinomHeap;
 		      Item name;
 		      int parent;
 		      int right_neighbor;
 		      int child;
 		      int degree;
 		      bool in;
 		      Prio prio;
 		      Store() : parent(-1), right_neighbor(-1), child(-1), degree(0),
 		        in(true) {}
 		    };
 		  };
 		} //namespace lemon
 		#endif //LEMON_BINOM_HEAP_H

lemon/fourary_heap.h

Show inline comments

 		/* -*- mode: C++; indent-tabs-mode: nil; -*-
+		 *
 		 * This file is a part of LEMON, a generic C++ optimization library.
+		 *
 		 * Copyright (C) 2003-2009
 		 * 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_FOURARY_HEAP_H
 		#define LEMON_FOURARY_HEAP_H
 		///\ingroup heaps
 		///\file
 		///\brief Fourary heap implementation.
 		#include <vector>
 		#include <utility>
 		#include <functional>
 		namespace lemon {
 		  /// \ingroup heaps
 		  ///
 		  ///\brief Fourary heap data structure.
 		  ///
 		  /// This class implements the \e fourary \e heap data structure.
 		  /// It fully conforms to the \ref concepts::Heap "heap concept".
 		  ///
 		  /// The fourary heap is a specialization of the \ref KaryHeap "K-ary heap"
 		  /// for <tt>K=4</tt>. It is similar to the \ref BinHeap "binary heap",
 		  /// but its nodes have at most four children, instead of two.
 		  ///
 		  /// \tparam PR Type of the priorities of the items.
 		  /// \tparam IM A read-writable item map with \c int values, used
 		  /// internally to handle the cross references.
 		  /// \tparam CMP A functor class for comparing the priorities.
 		  /// The default is \c std::less<PR>.
 		  ///
 		  ///\sa BinHeap
 		  ///\sa KaryHeap
 		#ifdef DOXYGEN
 		  template <typename PR, typename IM, typename CMP>
 		#else
 		  template <typename PR, typename IM, typename CMP = std::less<PR> >
 		#endif
 		  class FouraryHeap {
 		  public:
 		    /// Type of the item-int map.
 		    typedef IM ItemIntMap;
 		    /// Type of the priorities.
 		    typedef PR Prio;
 		    /// Type of the items stored in the heap.
 		    typedef typename ItemIntMap::Key Item;
 		    /// Type of the item-priority pairs.
 		    typedef std::pair<Item,Prio> Pair;
 		    /// Functor type for comparing the priorities.
 		    typedef CMP Compare;
 		    /// \brief Type to represent the states of the items.
 		    ///
 		    /// Each item has a state associated to it. It can be "in heap",
 		    /// "pre-heap" or "post-heap". The latter two are indifferent from the
 		    /// heap's point of view, but may be useful to the user.
 		    ///
 		    /// The item-int map must be initialized in such way that it assigns
 		    /// \c PRE_HEAP (<tt>-1</tt>) to any element to be put in the heap.
 		    enum State {
 		      IN_HEAP = 0,    ///< = 0.
 		      PRE_HEAP = -1,  ///< = -1.
 		      POST_HEAP = -2  ///< = -2.
 		    };
 		  private:
 		    std::vector<Pair> _data;
 		    Compare _comp;
 		    ItemIntMap &_iim;
 		  public:
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    explicit FouraryHeap(ItemIntMap &map) : _iim(map) {}
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    /// \param comp The function object used for comparing the priorities.
 		    FouraryHeap(ItemIntMap &map, const Compare &comp)
 		      : _iim(map), _comp(comp) {}
 		    /// \brief The number of items stored in the heap.
 		    ///
 		    /// This function returns the number of items stored in the heap.
 		    int size() const { return _data.size(); }
 		    /// \brief Check if the heap is empty.
 		    ///
 		    /// This function returns \c true if the heap is empty.
 		    bool empty() const { return _data.empty(); }
 		    /// \brief Make the heap empty.
 		    ///
 		    /// This functon makes the heap empty.
 		    /// It does not change the cross reference map. If you want to reuse
 		    /// a heap that is not surely empty, you should first clear it and
 		    /// then you should set the cross reference map to \c PRE_HEAP
 		    /// for each item.
 		    void clear() { _data.clear(); }
 		  private:
 		    static int parent(int i) { return (i-1)/4; }
 		    static int firstChild(int i) { return 4*i+1; }
 		    bool less(const Pair &p1, const Pair &p2) const {
 		      return _comp(p1.second, p2.second);
+		    }
 		    void bubbleUp(int hole, Pair p) {
 		      int par = parent(hole);
 		      while( hole>0 && less(p,_data[par]) ) {
 		        move(_data[par],hole);
 		        hole = par;
 		        par = parent(hole);
+		      }
 		      move(p, hole);
+		    }
 		    void bubbleDown(int hole, Pair p, int length) {
 		      if( length>1 ) {
 		        int child = firstChild(hole);
 		        while( child+3<length ) {
 		          int min=child;
 		          if( less(_data[++child], _data[min]) ) min=child;
 		          if( less(_data[++child], _data[min]) ) min=child;
 		          if( less(_data[++child], _data[min]) ) min=child;
 		          if( !less(_data[min], p) )
 		            goto ok;
 		          move(_data[min], hole);
 		          hole = min;
 		          child = firstChild(hole);
+		        }
 		        if ( child<length ) {
 		          int min = child;
 		          if( ++child<length && less(_data[child], _data[min]) ) min=child;
 		          if( ++child<length && less(_data[child], _data[min]) ) min=child;
 		          if( less(_data[min], p) ) {
 		            move(_data[min], hole);
 		            hole = min;
+		          }
+		        }
+		      }
 		    ok:
 		      move(p, hole);
+		    }
 		    void move(const Pair &p, int i) {
 		      _data[i] = p;
 		      _iim.set(p.first, i);
+		    }
 		  public:
 		    /// \brief Insert a pair of item and priority into the heap.
 		    ///
 		    /// This function inserts \c p.first to the heap with priority
 		    /// \c p.second.
 		    /// \param p The pair to insert.
 		    /// \pre \c p.first must not be stored in the heap.
 		    void push(const Pair &p) {
 		      int n = _data.size();
 		      _data.resize(n+1);
 		      bubbleUp(n, p);
+		    }
 		    /// \brief Insert an item into the heap with the given priority.
 		    ///
 		    /// This function inserts the given item into the heap with the
 		    /// given priority.
 		    /// \param i The item to insert.
 		    /// \param p The priority of the item.
 		    /// \pre \e i must not be stored in the heap.
 		    void push(const Item &i, const Prio &p) { push(Pair(i,p)); }
 		    /// \brief Return the item having minimum priority.
 		    ///
 		    /// This function returns the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Item top() const { return _data[0].first; }
 		    /// \brief The minimum priority.
 		    ///
 		    /// This function returns the minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Prio prio() const { return _data[0].second; }
 		    /// \brief Remove the item having minimum priority.
 		    ///
 		    /// This function removes the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    void pop() {
 		      int n = _data.size()-1;
 		      _iim.set(_data[0].first, POST_HEAP);
 		      if (n>0) bubbleDown(0, _data[n], n);
 		      _data.pop_back();
+		    }
 		    /// \brief Remove the given item from the heap.
 		    ///
 		    /// This function removes the given item from the heap if it is
 		    /// already stored.
 		    /// \param i The item to delete.
 		    /// \pre \e i must be in the heap.
 		    void erase(const Item &i) {
 		      int h = _iim[i];
 		      int n = _data.size()-1;
 		      _iim.set(_data[h].first, POST_HEAP);
 		      if( h<n ) {
 		        if( less(_data[parent(h)], _data[n]) )
 		          bubbleDown(h, _data[n], n);
 		        else
 		          bubbleUp(h, _data[n]);
+		      }
 		      _data.pop_back();
+		    }
 		    /// \brief The priority of the given item.
 		    ///
 		    /// This function returns the priority of the given item.
 		    /// \param i The item.
 		    /// \pre \e i must be in the heap.
 		    Prio operator[](const Item &i) const {
 		      int idx = _iim[i];
 		      return _data[idx].second;
+		    }
 		    /// \brief Set the priority of an item or insert it, if it is
 		    /// not stored in the heap.
 		    ///
 		    /// This method sets the priority of the given item if it is
 		    /// already stored in the heap. Otherwise it inserts the given
 		    /// item into the heap with the given priority.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    void set(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      if( idx < 0 )
 		        push(i,p);
 		      else if( _comp(p, _data[idx].second) )
 		        bubbleUp(idx, Pair(i,p));
 		      else
 		        bubbleDown(idx, Pair(i,p), _data.size());
+		    }
 		    /// \brief Decrease the priority of an item to the given value.
 		    ///
 		    /// This function decreases the priority of an item to the given value.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    /// \pre \e i must be stored in the heap with priority at least \e p.
 		    void decrease(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      bubbleUp(idx, Pair(i,p));
+		    }
 		    /// \brief Increase the priority of an item to the given value.
 		    ///
 		    /// This function increases the priority of an item to the given value.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    /// \pre \e i must be stored in the heap with priority at most \e p.
 		    void increase(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      bubbleDown(idx, Pair(i,p), _data.size());
+		    }
 		    /// \brief Return the state of an item.
 		    ///
 		    /// This method returns \c PRE_HEAP if the given item has never
 		    /// been in the heap, \c IN_HEAP if it is in the heap at the moment,
 		    /// and \c POST_HEAP otherwise.
 		    /// In the latter case it is possible that the item will get back
 		    /// to the heap again.
 		    /// \param i The item.
 		    State state(const Item &i) const {
 		      int s = _iim[i];
 		      if (s>=0) s=0;
 		      return State(s);
+		    }
 		    /// \brief Set the state of an item in the heap.
 		    ///
 		    /// This function sets the state of the given item in the heap.
 		    /// It can be used to manually clear the heap when it is important
 		    /// to achive better time complexity.
 		    /// \param i The item.
 		    /// \param st The state. It should not be \c IN_HEAP.
 		    void state(const Item& i, State st) {
 		      switch (st) {
 		        case POST_HEAP:
 		        case PRE_HEAP:
 		          if (state(i) == IN_HEAP) erase(i);
 		          _iim[i] = st;
 		          break;
 		        case IN_HEAP:
 		          break;
+		      }
+		    }
 		    /// \brief Replace an item in the heap.
 		    ///
 		    /// This function replaces item \c i with item \c j.
 		    /// Item \c i must be in the heap, while \c j must be out of the heap.
 		    /// After calling this method, item \c i will be out of the
 		    /// heap and \c j will be in the heap with the same prioriority
 		    /// as item \c i had before.
 		    void replace(const Item& i, const Item& j) {
 		      int idx = _iim[i];
 		      _iim.set(i, _iim[j]);
 		      _iim.set(j, idx);
 		      _data[idx].first = j;
+		    }
 		  }; // class FouraryHeap
 		} // namespace lemon
 		#endif // LEMON_FOURARY_HEAP_H

lemon/kary_heap.h

Show inline comments

 		/* -*- mode: C++; indent-tabs-mode: nil; -*-
+		 *
 		 * This file is a part of LEMON, a generic C++ optimization library.
+		 *
 		 * Copyright (C) 2003-2009
 		 * 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_KARY_HEAP_H
 		#define LEMON_KARY_HEAP_H
 		///\ingroup heaps
 		///\file
 		///\brief Fourary heap implementation.
 		#include <vector>
 		#include <utility>
 		#include <functional>
 		namespace lemon {
 		  /// \ingroup heaps
 		  ///
 		  ///\brief K-ary heap data structure.
 		  ///
 		  /// This class implements the \e K-ary \e heap data structure.
 		  /// It fully conforms to the \ref concepts::Heap "heap concept".
 		  ///
 		  /// The \ref KaryHeap "K-ary heap" is a generalization of the
 		  /// \ref BinHeap "binary heap" structure, its nodes have at most
 		  /// \c K children, instead of two.
 		  /// \ref BinHeap and \ref FouraryHeap are specialized implementations
 		  /// of this structure for <tt>K=2</tt> and <tt>K=4</tt>, respectively.
 		  ///
 		  /// \tparam PR Type of the priorities of the items.
 		  /// \tparam IM A read-writable item map with \c int values, used
 		  /// internally to handle the cross references.
 		  /// \tparam K The degree of the heap, each node have at most \e K
 		  /// children. The default is 16. Powers of two are suggested to use
 		  /// so that the multiplications and divisions needed to traverse the
 		  /// nodes of the heap could be performed faster.
 		  /// \tparam CMP A functor class for comparing the priorities.
 		  /// The default is \c std::less<PR>.
 		  ///
 		  ///\sa BinHeap
 		  ///\sa FouraryHeap
 		#ifdef DOXYGEN
 		  template <typename PR, typename IM, int K, typename CMP>
 		#else
 		  template <typename PR, typename IM, int K = 16,
 		            typename CMP = std::less<PR> >
 		#endif
 		  class KaryHeap {
 		  public:
 		    /// Type of the item-int map.
 		    typedef IM ItemIntMap;
 		    /// Type of the priorities.
 		    typedef PR Prio;
 		    /// Type of the items stored in the heap.
 		    typedef typename ItemIntMap::Key Item;
 		    /// Type of the item-priority pairs.
 		    typedef std::pair<Item,Prio> Pair;
 		    /// Functor type for comparing the priorities.
 		    typedef CMP Compare;
 		    /// \brief Type to represent the states of the items.
 		    ///
 		    /// Each item has a state associated to it. It can be "in heap",
 		    /// "pre-heap" or "post-heap". The latter two are indifferent from the
 		    /// heap's point of view, but may be useful to the user.
 		    ///
 		    /// The item-int map must be initialized in such way that it assigns
 		    /// \c PRE_HEAP (<tt>-1</tt>) to any element to be put in the heap.
 		    enum State {
 		      IN_HEAP = 0,    ///< = 0.
 		      PRE_HEAP = -1,  ///< = -1.
 		      POST_HEAP = -2  ///< = -2.
 		    };
 		  private:
 		    std::vector<Pair> _data;
 		    Compare _comp;
 		    ItemIntMap &_iim;
 		  public:
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    explicit KaryHeap(ItemIntMap &map) : _iim(map) {}
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    /// \param comp The function object used for comparing the priorities.
 		    KaryHeap(ItemIntMap &map, const Compare &comp)
 		      : _iim(map), _comp(comp) {}
 		    /// \brief The number of items stored in the heap.
 		    ///
 		    /// This function returns the number of items stored in the heap.
 		    int size() const { return _data.size(); }
 		    /// \brief Check if the heap is empty.
 		    ///
 		    /// This function returns \c true if the heap is empty.
 		    bool empty() const { return _data.empty(); }
 		    /// \brief Make the heap empty.
 		    ///
 		    /// This functon makes the heap empty.
 		    /// It does not change the cross reference map. If you want to reuse
 		    /// a heap that is not surely empty, you should first clear it and
 		    /// then you should set the cross reference map to \c PRE_HEAP
 		    /// for each item.
 		    void clear() { _data.clear(); }
 		  private:
 		    int parent(int i) { return (i-1)/K; }
 		    int firstChild(int i) { return K*i+1; }
 		    bool less(const Pair &p1, const Pair &p2) const {
 		      return _comp(p1.second, p2.second);
+		    }
 		    void bubbleUp(int hole, Pair p) {
 		      int par = parent(hole);
 		      while( hole>0 && less(p,_data[par]) ) {
 		        move(_data[par],hole);
 		        hole = par;
 		        par = parent(hole);
+		      }
 		      move(p, hole);
+		    }
 		    void bubbleDown(int hole, Pair p, int length) {
 		      if( length>1 ) {
 		        int child = firstChild(hole);
 		        while( child+K<=length ) {
 		          int min=child;
 		          for (int i=1; i<K; ++i) {
 		            if( less(_data[child+i], _data[min]) )
 		              min=child+i;
+		          }
 		          if( !less(_data[min], p) )
 		            goto ok;
 		          move(_data[min], hole);
 		          hole = min;
 		          child = firstChild(hole);
+		        }
 		        if ( child<length ) {
 		          int min = child;
 		          while (++child < length) {
 		            if( less(_data[child], _data[min]) )
 		              min=child;
+		          }
 		          if( less(_data[min], p) ) {
 		            move(_data[min], hole);
 		            hole = min;
+		          }
+		        }
+		      }
 		    ok:
 		      move(p, hole);
+		    }
 		    void move(const Pair &p, int i) {
 		      _data[i] = p;
 		      _iim.set(p.first, i);
+		    }
 		  public:
 		    /// \brief Insert a pair of item and priority into the heap.
 		    ///
 		    /// This function inserts \c p.first to the heap with priority
 		    /// \c p.second.
 		    /// \param p The pair to insert.
 		    /// \pre \c p.first must not be stored in the heap.
 		    void push(const Pair &p) {
 		      int n = _data.size();
 		      _data.resize(n+1);
 		      bubbleUp(n, p);
+		    }
 		    /// \brief Insert an item into the heap with the given priority.
 		    ///
 		    /// This function inserts the given item into the heap with the
 		    /// given priority.
 		    /// \param i The item to insert.
 		    /// \param p The priority of the item.
 		    /// \pre \e i must not be stored in the heap.
 		    void push(const Item &i, const Prio &p) { push(Pair(i,p)); }
 		    /// \brief Return the item having minimum priority.
 		    ///
 		    /// This function returns the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Item top() const { return _data[0].first; }
 		    /// \brief The minimum priority.
 		    ///
 		    /// This function returns the minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Prio prio() const { return _data[0].second; }
 		    /// \brief Remove the item having minimum priority.
 		    ///
 		    /// This function removes the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    void pop() {
 		      int n = _data.size()-1;
 		      _iim.set(_data[0].first, POST_HEAP);
 		      if (n>0) bubbleDown(0, _data[n], n);
 		      _data.pop_back();
+		    }
 		    /// \brief Remove the given item from the heap.
 		    ///
 		    /// This function removes the given item from the heap if it is
 		    /// already stored.
 		    /// \param i The item to delete.
 		    /// \pre \e i must be in the heap.
 		    void erase(const Item &i) {
 		      int h = _iim[i];
 		      int n = _data.size()-1;
 		      _iim.set(_data[h].first, POST_HEAP);
 		      if( h<n ) {
 		        if( less(_data[parent(h)], _data[n]) )
 		          bubbleDown(h, _data[n], n);
 		        else
 		          bubbleUp(h, _data[n]);
+		      }
 		      _data.pop_back();
+		    }
 		    /// \brief The priority of the given item.
 		    ///
 		    /// This function returns the priority of the given item.
 		    /// \param i The item.
 		    /// \pre \e i must be in the heap.
 		    Prio operator[](const Item &i) const {
 		      int idx = _iim[i];
 		      return _data[idx].second;
+		    }
 		    /// \brief Set the priority of an item or insert it, if it is
 		    /// not stored in the heap.
 		    ///
 		    /// This method sets the priority of the given item if it is
 		    /// already stored in the heap. Otherwise it inserts the given
 		    /// item into the heap with the given priority.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    void set(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      if( idx<0 )
 		        push(i,p);
 		      else if( _comp(p, _data[idx].second) )
 		        bubbleUp(idx, Pair(i,p));
 		      else
 		        bubbleDown(idx, Pair(i,p), _data.size());
+		    }
 		    /// \brief Decrease the priority of an item to the given value.
 		    ///
 		    /// This function decreases the priority of an item to the given value.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    /// \pre \e i must be stored in the heap with priority at least \e p.
 		    void decrease(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      bubbleUp(idx, Pair(i,p));
+		    }
 		    /// \brief Increase the priority of an item to the given value.
 		    ///
 		    /// This function increases the priority of an item to the given value.
 		    /// \param i The item.
 		    /// \param p The priority.
 		    /// \pre \e i must be stored in the heap with priority at most \e p.
 		    void increase(const Item &i, const Prio &p) {
 		      int idx = _iim[i];
 		      bubbleDown(idx, Pair(i,p), _data.size());
+		    }
 		    /// \brief Return the state of an item.
 		    ///
 		    /// This method returns \c PRE_HEAP if the given item has never
 		    /// been in the heap, \c IN_HEAP if it is in the heap at the moment,
 		    /// and \c POST_HEAP otherwise.
 		    /// In the latter case it is possible that the item will get back
 		    /// to the heap again.
 		    /// \param i The item.
 		    State state(const Item &i) const {
 		      int s = _iim[i];
 		      if (s>=0) s=0;
 		      return State(s);
+		    }
 		    /// \brief Set the state of an item in the heap.
 		    ///
 		    /// This function sets the state of the given item in the heap.
 		    /// It can be used to manually clear the heap when it is important
 		    /// to achive better time complexity.
 		    /// \param i The item.
 		    /// \param st The state. It should not be \c IN_HEAP.
 		    void state(const Item& i, State st) {
 		      switch (st) {
 		        case POST_HEAP:
 		        case PRE_HEAP:
 		          if (state(i) == IN_HEAP) erase(i);
 		          _iim[i] = st;
 		          break;
 		        case IN_HEAP:
 		          break;
+		      }
+		    }
 		    /// \brief Replace an item in the heap.
 		    ///
 		    /// This function replaces item \c i with item \c j.
 		    /// Item \c i must be in the heap, while \c j must be out of the heap.
 		    /// After calling this method, item \c i will be out of the
 		    /// heap and \c j will be in the heap with the same prioriority
 		    /// as item \c i had before.
 		    void replace(const Item& i, const Item& j) {
 		      int idx=_iim[i];
 		      _iim.set(i, _iim[j]);
 		      _iim.set(j, idx);
 		      _data[idx].first=j;
+		    }
 		  }; // class KaryHeap
 		} // namespace lemon
 		#endif // LEMON_KARY_HEAP_H

lemon/pairing_heap.h

Show inline comments

 		/* -*- mode: C++; indent-tabs-mode: nil; -*-
+		 *
 		 * This file is a part of LEMON, a generic C++ optimization library.
+		 *
 		 * Copyright (C) 2003-2009
 		 * 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_PAIRING_HEAP_H
 		#define LEMON_PAIRING_HEAP_H
 		///\file
 		///\ingroup heaps
 		///\brief Pairing heap implementation.
 		#include <vector>
 		#include <utility>
 		#include <functional>
 		#include <lemon/math.h>
 		namespace lemon {
 		  /// \ingroup heaps
 		  ///
 		  ///\brief Pairing Heap.
 		  ///
 		  /// This class implements the \e pairing \e heap data structure.
 		  /// It fully conforms to the \ref concepts::Heap "heap concept".
 		  ///
 		  /// The methods \ref increase() and \ref erase() are not efficient
 		  /// in a pairing heap. In case of many calls of these operations,
 		  /// it is better to use other heap structure, e.g. \ref BinHeap
 		  /// "binary heap".
 		  ///
 		  /// \tparam PR Type of the priorities of the items.
 		  /// \tparam IM A read-writable item map with \c int values, used
 		  /// internally to handle the cross references.
 		  /// \tparam CMP A functor class for comparing the priorities.
 		  /// The default is \c std::less<PR>.
 		#ifdef DOXYGEN
 		  template <typename PR, typename IM, typename CMP>
 		#else
 		  template <typename PR, typename IM, typename CMP = std::less<PR> >
 		#endif
 		  class PairingHeap {
 		  public:
 		    /// Type of the item-int map.
 		    typedef IM ItemIntMap;
 		    /// Type of the priorities.
 		    typedef PR Prio;
 		    /// Type of the items stored in the heap.
 		    typedef typename ItemIntMap::Key Item;
 		    /// Functor type for comparing the priorities.
 		    typedef CMP Compare;
 		    /// \brief Type to represent the states of the items.
 		    ///
 		    /// Each item has a state associated to it. It can be "in heap",
 		    /// "pre-heap" or "post-heap". The latter two are indifferent from the
 		    /// heap's point of view, but may be useful to the user.
 		    ///
 		    /// The item-int map must be initialized in such way that it assigns
 		    /// \c PRE_HEAP (<tt>-1</tt>) to any element to be put in the heap.
 		    enum State {
 		      IN_HEAP = 0,    ///< = 0.
 		      PRE_HEAP = -1,  ///< = -1.
 		      POST_HEAP = -2  ///< = -2.
 		    };
 		  private:
 		    class store;
 		    std::vector<store> _data;
 		    int _min;
 		    ItemIntMap &_iim;
 		    Compare _comp;
 		    int _num_items;
 		  public:
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    explicit PairingHeap(ItemIntMap &map)
 		      : _min(0), _iim(map), _num_items(0) {}
 		    /// \brief Constructor.
 		    ///
 		    /// Constructor.
 		    /// \param map A map that assigns \c int values to the items.
 		    /// It is used internally to handle the cross references.
 		    /// The assigned value must be \c PRE_HEAP (<tt>-1</tt>) for each item.
 		    /// \param comp The function object used for comparing the priorities.
 		    PairingHeap(ItemIntMap &map, const Compare &comp)
 		      : _min(0), _iim(map), _comp(comp), _num_items(0) {}
 		    /// \brief The number of items stored in the heap.
 		    ///
 		    /// This function returns the number of items stored in the heap.
 		    int size() const { return _num_items; }
 		    /// \brief Check if the heap is empty.
 		    ///
 		    /// This function returns \c true if the heap is empty.
 		    bool empty() const { return _num_items==0; }
 		    /// \brief Make the heap empty.
 		    ///
 		    /// This functon makes the heap empty.
 		    /// It does not change the cross reference map. If you want to reuse
 		    /// a heap that is not surely empty, you should first clear it and
 		    /// then you should set the cross reference map to \c PRE_HEAP
 		    /// for each item.
 		    void clear() {
 		      _data.clear();
 		      _min = 0;
 		      _num_items = 0;
+		    }
 		    /// \brief Set the priority of an item or insert it, if it is
 		    /// not stored in the heap.
 		    ///
 		    /// This method sets the priority of the given item if it is
 		    /// already stored in the heap. Otherwise it inserts the given
 		    /// item into the heap with the given priority.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    void set (const Item& item, const Prio& value) {
 		      int i=_iim[item];
 		      if ( i>=0 && _data[i].in ) {
 		        if ( _comp(value, _data[i].prio) ) decrease(item, value);
 		        if ( _comp(_data[i].prio, value) ) increase(item, value);
 		      } else push(item, value);
+		    }
 		    /// \brief Insert an item into the heap with the given priority.
 		    ///
 		    /// This function inserts the given item into the heap with the
 		    /// given priority.
 		    /// \param item The item to insert.
 		    /// \param value The priority of the item.
 		    /// \pre \e item must not be stored in the heap.
 		    void push (const Item& item, const Prio& value) {
 		      int i=_iim[item];
 		      if( i<0 ) {
 		        int s=_data.size();
 		        _iim.set(item, s);
 		        store st;
 		        st.name=item;
 		        _data.push_back(st);
 		        i=s;
 		      } else {
 		        _data[i].parent=_data[i].child=-1;
 		        _data[i].left_child=false;
 		        _data[i].degree=0;
 		        _data[i].in=true;
+		      }
 		      _data[i].prio=value;
 		      if ( _num_items!=0 ) {
 		        if ( _comp( value, _data[_min].prio) ) {
 		          fuse(i,_min);
 		          _min=i;
+		        }
 		        else fuse(_min,i);
+		      }
 		      else _min=i;
 		      ++_num_items;
+		    }
 		    /// \brief Return the item having minimum priority.
 		    ///
 		    /// This function returns the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    Item top() const { return _data[_min].name; }
 		    /// \brief The minimum priority.
 		    ///
 		    /// This function returns the minimum priority.
 		    /// \pre The heap must be non-empty.
 		    const Prio& prio() const { return _data[_min].prio; }
 		    /// \brief The priority of the given item.
 		    ///
 		    /// This function returns the priority of the given item.
 		    /// \param item The item.
 		    /// \pre \e item must be in the heap.
 		    const Prio& operator[](const Item& item) const {
 		      return _data[_iim[item]].prio;
+		    }
 		    /// \brief Remove the item having minimum priority.
 		    ///
 		    /// This function removes the item having minimum priority.
 		    /// \pre The heap must be non-empty.
 		    void pop() {
 		      std::vector<int> trees;
 		      int i=0, child_right = 0;
 		      _data[_min].in=false;
 		      if( -1!=_data[_min].child ) {
 		        i=_data[_min].child;
 		        trees.push_back(i);
 		        _data[i].parent = -1;
 		        _data[_min].child = -1;
 		        int ch=-1;
 		        while( _data[i].child!=-1 ) {
 		          ch=_data[i].child;
 		          if( _data[ch].left_child && i==_data[ch].parent ) {
 		            break;
 		          } else {
 		            if( _data[ch].left_child ) {
 		              child_right=_data[ch].parent;
 		              _data[ch].parent = i;
 		              --_data[i].degree;
+		            }
 		            else {
 		              child_right=ch;
 		              _data[i].child=-1;
 		              _data[i].degree=0;
+		            }
 		            _data[child_right].parent = -1;
 		            trees.push_back(child_right);
 		            i = child_right;
+		          }
+		        }
 		        int num_child = trees.size();
 		        int other;
 		        for( i=0; i<num_child-1; i+=2 ) {
 		          if ( !_comp(_data[trees[i]].prio, _data[trees[i+1]].prio) ) {
 		            other=trees[i];
 		            trees[i]=trees[i+1];
 		            trees[i+1]=other;
+		          }
 		          fuse( trees[i], trees[i+1] );
+		        }
 		        i = (0==(num_child % 2)) ? num_child-2 : num_child-1;
 		        while(i>=2) {
 		          if ( _comp(_data[trees[i]].prio, _data[trees[i-2]].prio) ) {
 		            other=trees[i];
 		            trees[i]=trees[i-2];
 		            trees[i-2]=other;
+		          }
 		          fuse( trees[i-2], trees[i] );
 		          i-=2;
+		        }
 		        _min = trees[0];
+		      }
 		      else {
 		        _min = _data[_min].child;
+		      }
 		      if (_min >= 0) _data[_min].left_child = false;
 		      --_num_items;
+		    }
 		    /// \brief Remove the given item from the heap.
 		    ///
 		    /// This function removes the given item from the heap if it is
 		    /// already stored.
 		    /// \param item The item to delete.
 		    /// \pre \e item must be in the heap.
 		    void erase (const Item& item) {
 		      int i=_iim[item];
 		      if ( i>=0 && _data[i].in ) {
 		        decrease( item, _data[_min].prio-1 );
 		        pop();
+		      }
+		    }
 		    /// \brief Decrease the priority of an item to the given value.
 		    ///
 		    /// This function decreases the priority of an item to the given value.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    /// \pre \e item must be stored in the heap with priority at least \e value.
 		    void decrease (Item item, const Prio& value) {
 		      int i=_iim[item];
 		      _data[i].prio=value;
 		      int p=_data[i].parent;
 		      if( _data[i].left_child && i!=_data[p].child ) {
 		        p=_data[p].parent;
+		      }
 		      if ( p!=-1 && _comp(value,_data[p].prio) ) {
 		        cut(i,p);
 		        if ( _comp(_data[_min].prio,value) ) {
 		          fuse(_min,i);
 		        } else {
 		          fuse(i,_min);
 		          _min=i;
+		        }
+		      }
+		    }
 		    /// \brief Increase the priority of an item to the given value.
 		    ///
 		    /// This function increases the priority of an item to the given value.
 		    /// \param item The item.
 		    /// \param value The priority.
 		    /// \pre \e item must be stored in the heap with priority at most \e value.
 		    void increase (Item item, const Prio& value) {
 		      erase(item);
 		      push(item,value);
+		    }
 		    /// \brief Return the state of an item.
 		    ///
 		    /// This method returns \c PRE_HEAP if the given item has never
 		    /// been in the heap, \c IN_HEAP if it is in the heap at the moment,
 		    /// and \c POST_HEAP otherwise.
 		    /// In the latter case it is possible that the item will get back
 		    /// to the heap again.
 		    /// \param item The item.
 		    State state(const Item &item) const {
 		      int i=_iim[item];
 		      if( i>=0 ) {
 		        if( _data[i].in ) i=0;
 		        else i=-2;
+		      }
 		      return State(i);
+		    }
 		    /// \brief Set the state of an item in the heap.
 		    ///
 		    /// This function sets the state of the given item in the heap.
 		    /// It can be used to manually clear the heap when it is important
 		    /// to achive better time complexity.
 		    /// \param i The item.
 		    /// \param st The state. It should not be \c IN_HEAP.
 		    void state(const Item& i, State st) {
 		      switch (st) {
 		      case POST_HEAP:
 		      case PRE_HEAP:
 		        if (state(i) == IN_HEAP) erase(i);
 		        _iim[i]=st;
 		        break;
 		      case IN_HEAP:
 		        break;
+		      }
+		    }
 		  private:
 		    void cut(int a, int b) {
 		      int child_a;
 		      switch (_data[a].degree) {
 		        case 2:
 		          child_a = _data[_data[a].child].parent;
 		          if( _data[a].left_child ) {
 		            _data[child_a].left_child=true;
 		            _data[b].child=child_a;
 		            _data[child_a].parent=_data[a].parent;
+		          }
 		          else {
 		            _data[child_a].left_child=false;
 		            _data[child_a].parent=b;
 		            if( a!=_data[b].child )
 		              _data[_data[b].child].parent=child_a;
 		            else
 		              _data[b].child=child_a;
+		          }
 		          --_data[a].degree;
 		          _data[_data[a].child].parent=a;
 		          break;
 		        case 1:
 		          child_a = _data[a].child;
 		          if( !_data[child_a].left_child ) {
 		            --_data[a].degree;
 		            if( _data[a].left_child ) {
 		              _data[child_a].left_child=true;
 		              _data[child_a].parent=_data[a].parent;
 		              _data[b].child=child_a;
+		            }
 		            else {
 		              _data[child_a].left_child=false;
 		              _data[child_a].parent=b;
 		              if( a!=_data[b].child )
 		                _data[_data[b].child].parent=child_a;
 		              else
 		                _data[b].child=child_a;
+		            }
 		            _data[a].child=-1;
+		          }
 		          else {
 		            --_data[b].degree;
 		            if( _data[a].left_child ) {
 		              _data[b].child =
 		                (1==_data[b].degree) ? _data[a].parent : -1;
 		            } else {
 		              if (1==_data[b].degree)
 		                _data[_data[b].child].parent=b;
 		              else
 		                _data[b].child=-1;
+		            }
+		          }
 		          break;
 		        case 0:
 		          --_data[b].degree;
 		          if( _data[a].left_child ) {
 		            _data[b].child =
 		              (0!=_data[b].degree) ? _data[a].parent : -1;
 		          } else {
 		            if( 0!=_data[b].degree )
 		              _data[_data[b].child].parent=b;
 		            else
 		              _data[b].child=-1;
+		          }
 		          break;
+		      }
 		      _data[a].parent=-1;
 		      _data[a].left_child=false;
+		    }
 		    void fuse(int a, int b) {
 		      int child_a = _data[a].child;
 		      int child_b = _data[b].child;
 		      _data[a].child=b;
 		      _data[b].parent=a;
 		      _data[b].left_child=true;
 		      if( -1!=child_a ) {
 		        _data[b].child=child_a;
 		        _data[child_a].parent=b;
 		        _data[child_a].left_child=false;
 		        ++_data[b].degree;
 		        if( -1!=child_b ) {
 		           _data[b].child=child_b;
 		           _data[child_b].parent=child_a;
+		        }
+		      }
 		      else { ++_data[a].degree; }
+		    }
 		    class store {
 		      friend class PairingHeap;
 		      Item name;
 		      int parent;
 		      int child;
 		      bool left_child;
 		      int degree;
 		      bool in;
 		      Prio prio;
 		      store() : parent(-1), child(-1), left_child(false), degree(0), in(true) {}
 		    };
 		  };
 		} //namespace lemon
 		#endif //LEMON_PAIRING_HEAP_H

lemon/Makefile.am

Show inline comments

@@ -57,12 +57,13 @@
 			lemon/adaptors.h \
 			lemon/arg_parser.h \
 			lemon/assert.h \
 			lemon/bellman_ford.h \
 			lemon/bfs.h \
 			lemon/bin_heap.h \
 			lemon/binom_heap.h \
 			lemon/bucket_heap.h \
 			lemon/cbc.h \
 			lemon/circulation.h \
 			lemon/clp.h \
 			lemon/color.h \
 			lemon/concept_check.h \
@@ -76,18 +77,20 @@
 			lemon/dimacs.h \
 			lemon/edge_set.h \
 			lemon/elevator.h \
 			lemon/error.h \
 			lemon/euler.h \
 			lemon/fib_heap.h \
 			lemon/fourary_heap.h \
 			lemon/full_graph.h \
 			lemon/glpk.h \
 			lemon/gomory_hu.h \
 			lemon/graph_to_eps.h \
 			lemon/grid_graph.h \
 			lemon/hypercube_graph.h \
 			lemon/kary_heap.h \
 			lemon/kruskal.h \
 			lemon/hao_orlin.h \
 			lemon/lgf_reader.h \
 			lemon/lgf_writer.h \
 			lemon/list_graph.h \
 			lemon/lp.h \
@@ -96,12 +99,13 @@
 			lemon/maps.h \
 			lemon/matching.h \
 			lemon/math.h \
 			lemon/min_cost_arborescence.h \
 			lemon/nauty_reader.h \
 			lemon/network_simplex.h \
 			lemon/pairing_heap.h \
 			lemon/path.h \
 			lemon/preflow.h \
 			lemon/radix_heap.h \
 			lemon/radix_sort.h \
 			lemon/random.h \
 			lemon/smart_graph.h \

test/heap_test.cc

Show inline comments

@@ -22,20 +22,23 @@
 		#include <vector>
 		#include <lemon/concept_check.h>
 		#include <lemon/concepts/heap.h>
 		#include <lemon/smart_graph.h>
 		#include <lemon/lgf_reader.h>
 		#include <lemon/dijkstra.h>
 		#include <lemon/maps.h>
 		#include <lemon/bin_heap.h>
 		#include <lemon/fourary_heap.h>
 		#include <lemon/kary_heap.h>
 		#include <lemon/fib_heap.h>
 		#include <lemon/pairing_heap.h>
 		#include <lemon/radix_heap.h>
 		#include <lemon/binom_heap.h>
 		#include <lemon/bucket_heap.h>
 		#include "test_tools.h"
 		using namespace lemon;
 		using namespace lemon::concepts;
@@ -86,17 +89,15 @@
 		int test_len = sizeof(test_seq) / sizeof(test_seq[0]);
 		template <typename Heap>
 		void heapSortTest() {
 		  RangeMap<int> map(test_len, -1);
 		  Heap heap(map);
 		  std::vector<int> v(test_len);
 		  for (int i = 0; i < test_len; ++i) {
 		    v[i] = test_seq[i];
 		    heap.push(i, v[i]);
+		  }
 		  std::sort(v.begin(), v.end());
 		  for (int i = 0; i < test_len; ++i) {
@@ -109,13 +110,12 @@
 		void heapIncreaseTest() {
 		  RangeMap<int> map(test_len, -1);
 		  Heap heap(map);
 		  std::vector<int> v(test_len);
 		  for (int i = 0; i < test_len; ++i) {
 		    v[i] = test_seq[i];
 		    heap.push(i, v[i]);
+		  }
 		  for (int i = 0; i < test_len; ++i) {
 		    v[i] += test_inc[i];
@@ -125,14 +125,12 @@
 		  for (int i = 0; i < test_len; ++i) {
 		    check(v[i] == heap.prio() ,"Wrong order in heap increase test.");
 		    heap.pop();
+		  }
+		}
 		template <typename Heap>
 		void dijkstraHeapTest(const Digraph& digraph, const IntArcMap& length,
 		                      Node source) {
 		  typename Dijkstra<Digraph, IntArcMap>::template SetStandardHeap<Heap>::
 		    Create dijkstra(digraph, length);
@@ -141,22 +139,22 @@
 		  for(ArcIt a(digraph); a != INVALID; ++a) {
 		    Node s = digraph.source(a);
 		    Node t = digraph.target(a);
 		    if (dijkstra.reached(s)) {
 		      check( dijkstra.dist(t) - dijkstra.dist(s) <= length[a],
-		             "Error in a shortest path tree!");
+		             "Error in shortest path tree.");
+		    }
+		  }
 		  for(NodeIt n(digraph); n != INVALID; ++n) {
 		    if ( dijkstra.reached(n) && dijkstra.predArc(n) != INVALID ) {
 		      Arc a = dijkstra.predArc(n);
 		      Node s = digraph.source(a);
 		      check( dijkstra.dist(n) - dijkstra.dist(s) == length[a],
-		             "Error in a shortest path tree!");
+		             "Error in shortest path tree.");
+		    }
+		  }
+		}
 		int main() {
@@ -172,53 +170,107 @@
 		  std::istringstream input(test_lgf);
 		  digraphReader(digraph, input).
 		    arcMap("capacity", length).
 		    node("source", source).
 		    run();
 		  // BinHeap
+		  {
 		    typedef BinHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef BinHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // FouraryHeap
+		  {
 		    typedef FouraryHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef FouraryHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // KaryHeap
+		  {
 		    typedef KaryHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef KaryHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // FibHeap
+		  {
 		    typedef FibHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef FibHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // PairingHeap
+		  {
 		    typedef PairingHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef PairingHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // RadixHeap
+		  {
 		    typedef RadixHeap<ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef RadixHeap<IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // BinomHeap
+		  {
 		    typedef BinomHeap<Prio, ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef BinomHeap<Prio, IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
+		  }
 		  // BucketHeap, SimpleBucketHeap
+		  {
 		    typedef BucketHeap<ItemIntMap> IntHeap;
 		    checkConcept<Heap<Prio, ItemIntMap>, IntHeap>();
 		    heapSortTest<IntHeap>();
 		    heapIncreaseTest<IntHeap>();
 		    typedef BucketHeap<IntNodeMap > NodeHeap;
 		    checkConcept<Heap<Prio, IntNodeMap >, NodeHeap>();
 		    dijkstraHeapTest<NodeHeap>(digraph, length, source);
 		    typedef SimpleBucketHeap<ItemIntMap> SimpleIntHeap;
 		    heapSortTest<SimpleIntHeap>();
+		  }
 		  return 0;
+		}

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