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224 lines
6.6 KiB
C++
224 lines
6.6 KiB
C++
LeftistHeap.cpp - Implementation for leftist heap
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#include "LeftistHeap.h"
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#include "dsexceptions.h"
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/**
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* Construct the leftist heap.
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*/
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template <class Comparable>
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LeftistHeap<Comparable>::LeftistHeap( )
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{
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root = NULL;
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}
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/**
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* Copy constructor.
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*/
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template <class Comparable>
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LeftistHeap<Comparable>::LeftistHeap( const LeftistHeap<Comparable> & rhs )
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{
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root = NULL;
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*this = rhs;
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}
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/**
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* Destruct the leftist heap.
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*/
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template <class Comparable>
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LeftistHeap<Comparable>::~LeftistHeap( )
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{
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makeEmpty( );
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}
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/**
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* Merge rhs into the priority queue.
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* rhs becomes empty. rhs must be different from this.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::merge( LeftistHeap & rhs )
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{
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if( this == &rhs ) // Avoid aliasing problems
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return;
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root = merge( root, rhs.root );
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rhs.root = NULL;
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}
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/**
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* Internal method to merge two roots.
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* Deals with deviant cases and calls recursive merge1.
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*/
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template <class Comparable>
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LeftistNode<Comparable> *
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LeftistHeap<Comparable>::merge( LeftistNode<Comparable> * h1,
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LeftistNode<Comparable> * h2 ) const
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{
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if( h1 == NULL )
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return h2;
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if( h2 == NULL )
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return h1;
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if( h1->element < h2->element )
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return merge1( h1, h2 );
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else
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return merge1( h2, h1 );
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}
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/**
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* Internal method to merge two roots.
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* Assumes trees are not empty, and h1's root contains smallest item.
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*/
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template <class Comparable>
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LeftistNode<Comparable> *
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LeftistHeap<Comparable>::merge1( LeftistNode<Comparable> * h1,
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LeftistNode<Comparable> * h2 ) const
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{
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if( h1->left == NULL ) // Single node
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h1->left = h2; // Other fields in h1 already accurate
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else
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{
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h1->right = merge( h1->right, h2 );
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if( h1->left->npl < h1->right->npl )
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swapChildren( h1 );
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h1->npl = h1->right->npl + 1;
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}
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return h1;
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}
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/**
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* Swaps t's two children.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::swapChildren( LeftistNode<Comparable> * t ) const
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{
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LeftistNode<Comparable> *tmp = t->left;
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t->left = t->right;
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t->right = tmp;
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}
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/**
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* Insert item x into the priority queue, maintaining heap order.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::insert( const Comparable & x )
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{
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root = merge( new LeftistNode<Comparable>( x ), root );
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}
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/**
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* Find the smallest item in the priority queue.
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* Return the smallest item, or throw Underflow if empty.
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*/
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template <class Comparable>
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const Comparable & LeftistHeap<Comparable>::findMin( ) const
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{
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if( isEmpty( ) )
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throw Underflow( );
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return root->element;
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}
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/**
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* Remove the smallest item from the priority queue.
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* Throws Underflow if empty.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::deleteMin( )
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{
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if( isEmpty( ) )
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throw Underflow( );
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LeftistNode<Comparable> *oldRoot = root;
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root = merge( root->left, root->right );
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delete oldRoot;
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}
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/**
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* Remove the smallest item from the priority queue.
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* Pass back the smallest item, or throw Underflow if empty.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::deleteMin( Comparable & minItem )
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{
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minItem = findMin( );
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deleteMin( );
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}
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/**
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* Test if the priority queue is logically empty.
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* Returns true if empty, false otherwise.
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*/
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template <class Comparable>
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bool LeftistHeap<Comparable>::isEmpty( ) const
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{
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return root == NULL;
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}
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/**
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* Test if the priority queue is logically full.
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* Returns false in this implementation.
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*/
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template <class Comparable>
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bool LeftistHeap<Comparable>::isFull( ) const
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{
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return false;
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}
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/**
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* Make the priority queue logically empty.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::makeEmpty( )
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{
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reclaimMemory( root );
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root = NULL;
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}
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/**
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* Deep copy.
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*/
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template <class Comparable>
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const LeftistHeap<Comparable> &
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LeftistHeap<Comparable>::
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operator=( const LeftistHeap<Comparable> & rhs )
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{
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if( this != &rhs )
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{
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makeEmpty( );
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root = clone( rhs.root );
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}
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return *this;
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}
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/**
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* Internal method to make the tree empty.
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* WARNING: This is prone to running out of stack space;
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* exercises suggest a solution.
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*/
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template <class Comparable>
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void LeftistHeap<Comparable>::reclaimMemory( LeftistNode<Comparable> * t ) const
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{
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if( t != NULL )
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{
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reclaimMemory( t->left );
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reclaimMemory( t->right );
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delete t;
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}
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}
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/**
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* Internal method to clone subtree.
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* WARNING: This is prone to running out of stack space.
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* exercises suggest a solution.
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*/
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template <class Comparable>
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LeftistNode<Comparable> *
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LeftistHeap<Comparable>::clone( LeftistNode<Comparable> * t ) const
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{
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if( t == NULL )
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return NULL;
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else
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return new LeftistNode<Comparable>( t->element, clone( t->left ),
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clone( t->right ), t->npl );
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}
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