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Heaps

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Title: Heaps


1
Heaps
  • Priority Queues

2
Outline
  • Binary heaps
  • Binomial queues
  • Leftist heaps

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Binary Heaps
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Heap order property
  • For every root node N, the key in the parent of
    N is smaller than or equal to the key in N.

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The smallest value is in the root.
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Operations on priority queues
  • Insert
  • Put an element into the queue
  • DeleteMin
  • Find the minimal element
  • Return it
  • Remove it from the queue

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Binary Heaps
  • A binary heap is an implementation of a priority
    queue.
  • A binary heap is a complete binary tree with heap
    order property.

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Complete Binary Tree
  • A binary tree is a complete binary tree if
  • every level in the tree is completely filled,
  • except the leaf level, which is filled from left
    to right.

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Height is in ?log2 n?, where n is the number of
nodes.
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Array implementation of complete binary tree
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Class BinaryHeap
  • public class BinaryHeap
  • public BinaryHeap( )
  • this( DEFAULT_CAPACITY )
  • public BinaryHeap( int capacity )
  • currentSize 0
  • array new Comparable capacity 1
  • private static final int DEFAULT_CAPACITY 100
  • private int currentSize // Number
    of elements in heap
  • private Comparable array // The heap
    array

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percolateUp
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Method percolateUp
  • private void percolateUp( int hole )
  • Comparable x arrayhole
  • while (hole gt 1 x.compareTo( array hole / 2
    ) lt 0)
  • array hole array hole/2
  • hole hole/2
  • array hole x

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Method percolateUp
  • private void percolateUp( int hole )
  • while (holegt1 arrayhole.compareTo( array
    hole/2 )lt0)
  • swap(hole, hole/2)
  • hole hole/2
  • private void swap( int p1, int p2 )
  • Comparable x arrayp1
  • arrayp1 arrayp2
  • arrayp2 x

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PercolateDown
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Method percolateDown
  • private void percolateDown( int hole )
  • int child
  • while( hole 2 lt currentSize)
  • child hole 2
  • if(child ! currentSizearray
    child1.compareTo( arraychild )lt0)
  • child // choose the smaller child
  • if( array child .compareTo( array hole ) lt
    0 )
  • swap( hole, child )
  • else
  • break
  • hole child

15
Method percolateDown
  • private void percolateDown( int hole )
  • int child
  • Comparable tmp array hole //
    save the value of the node
  • while ( hole 2 lt currentSize )
  • child hole 2
  • if(child ! currentSizearray
    child1.compareTo( arraychild )lt0)
  • child // choose the smaller child
  • if( array child .compareTo( tmp ) lt 0 )
  • array hole array child // move child
    up
  • hole child // move hole down
  • else
  • break
  • array hole tmp // put the value in the
    hole

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Insertion
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Method insert
  • public void insert( Comparable x ) throws
    Overflow
  • if( isFull( ) ) throw new Overflow( )
  • arraycurrentSizex
  • percolateUp(currentSize)

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DeleteMin
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Method deleteMin
  • public Comparable findMin( )
  • if( isEmpty( ) ) return null
  • return array 1
  • public Comparable deleteMin( )
  • if( isEmpty( ) ) return null
  • Comparable minItem findMin( )
  • array 1 array currentSize--
  • percolateDown( 1 )
  • return minItem

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Method buildHeap
  • private void buildHeap( )
  • for( int i currentSize / 2 i gt 0 i-- )
  • percolateDown( i )

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Method decreaseKey
  • public void decreaseKey(int p, Comparable d)
  • throws outOfRange
  • if( pgtcurrentSize ) throw new outOfRange()
  • array p array p - d
  • percolateUp( p )

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Method increaseKey
  • public void increaseKey(int p, Comparable d)
  • throws outOfRange
  • if( pgtcurrentSize ) throw new outOfRange()
  • array p array p d
  • percolateDown( p )

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Binomial Queues
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Binomial Tree
  • A binomial tree is defined recursively as follow
  • A binomial tree of height 0, denoted by B0, is a
    one-node tree.
  • A binomial tree of height k, denoted by Bk, is
    formed by attaching a binomial tree Bk-1 to the
    root of another binomial tree Bk-1.

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Property of Binomial Trees
  • A binomial tree of height k has 2k nodes.
  • The number of nodes at depth d is the binomial
    coefficient ? k?
  • ?d?.

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1 1 5 10 10 5 1 1 6 15 20 15 6 1
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Structure
  • A binomial queue is a collection of heap-ordered
    trees, each of which is a binomial tree.

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Binomial Nodes
  • class BinomialNode
  • BinomialNode( Comparable theElement )
  • this( theElement, null, null )
  • BinomialNode( Comparable theElement,
  • BinomialNode lt, BinomialNode nt )
  • element theElement
  • Child lt nextSibling nt
  • Comparable element
  • BinomialNode Child
  • BinomialNode nextSibling

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Examples binomial nodes
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Child
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nextSibling
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Binomial Queues
  • public class BinomialQueue
  • public BinomialQueue( )
  • theTrees new BinomialNode MAX_TREES
  • makeEmpty( )
  • ...
  • public void makeEmpty( )
  • currentSize 0
  • for( int i0 i lt theTrees.length i )
  • theTrees i null
  • private static final int MAX_TREES 14
  • private int currentSize
  • private BinomialNode theTrees
  • private int capacity( )
  • return 2theTrees.length - 1

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Method combineTrees
  • private static BinomialNode combineTrees
  • ( BinomialNode t1,BinomialNode t2 )
  • if( t1.element.compareTo( t2.element ) gt 0 )
  • return combineTrees( t2, t1 )
  • t2.nextSibling t1.Child
  • t1.leftChild t2
  • return t1

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Method merge (1)
  • public void merge( BinomialQueue rhs )
  • throws Overflow
  • if( this rhs ) return
  • if( currentSizerhs.currentSizegtcapacity() )
  • throw new Overflow( )
  • currentSize rhs.currentSize
  • BinomialNode carry null
  • for( int i0,j1 jltcurrentSize i,j2 )
  • BinomialNode t1 theTrees i
  • BinomialNode t2 rhs.theTrees i

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Method merge (2)
  • // No trees
  • if (t1null t2null carrynull)
  • // Only this
  • if (t1!null t2null carrynull)
  • // Only rhs
  • if (t1null t2!null carrynull)
  • theTreesi t2 rhs.theTreesi null
  • // Only carry
  • if (t1null t2null carry!null)
  • theTrees i carry carry null
  • // this rhs
  • if (t1!null t2null carry!null)
  • carry combineTrees( t1, t2 )
  • theTreesirhs.theTreesinull

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Method merge (3)
  • // this and carry
  • if (t1!null t2null carry!null)
  • carry combineTrees( t1, carry )
  • theTrees i null
  • // rhs and carry
  • if (t1null t2!null carry!null)
  • carry combineTrees( t2, carry )
  • rhs.theTrees i null
  • // All three
  • if (t1!null t2!null carry!null)
  • theTrees i carry
  • carry combineTrees( t1, t2 )
  • rhs.theTrees i null

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Method merge (4)
  • for( int k0 k lt rhs.theTrees.length k )
  • rhs.theTrees k null
  • rhs.currentSize 0

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Method insert
  • public void insert( Comparable x )
  • throws Overflow
  • BinomialQueue oneItem new BinomialQueue( )
  • oneItem.currentSize 1
  • oneItem.theTrees0 new BinomialNode( x )
  • merge( oneItem )

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Method deleteMin (2)
  • for( int j minIndex - 1 j gt 0 j-- )
  • deletedQueue.theTrees j deletedTree
  • deletedTree deletedTree.nextSibling
  • deletedQueue.theTrees j .nextSibling
  • null
  • theTrees minIndex null
  • currentSize - deletedQueue.currentSize 1
  • try merge( deletedQueue )
  • catch( Overflow e )
  • return minItem

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Method deleteMin
  • public Comparable deleteMin( )
  • if( isEmpty( ) ) return null
  • int minIndex findMinIndex( )
  • Comparable minItem
  • theTreesminIndex.element
  • BinomialNode deletedTree
  • theTrees minIndex .child
  • BinomialQueue deletedQueue
  • new BinomialQueue( )
  • deletedQueue.currentSize (1 ltlt minIndex)-1

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Leftist Heaps
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Null Path Length
  • The null path length of the node X, npl(X), is
    the length of the shortest path from X to a node
    without 2 children.
  • npl(X) 1 min (npl(Y1), npl(Y2)), where Y1 and
    Y2 are children of X.

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Leftist Trees
  • A leftist tree is a binary tree such that for
    every node X in the tree npl(left) ? npl(right),
    where left and right are left child and right
    child of X.

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Examples of leftist trees
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Leftist Heap
  • A leftist heap is a leftist tree with heap order
    property.

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Leftist Tree Nodes
  • class LeftHeapNode
  • LeftHeapNode( Comparable theElement )
  • this( theElement, null, null )
  • LeftHeapNode( Comparable theElement,
  • LeftHeapNode lt, LeftHeapNode rt )
  • element theElement npl 0
  • left lt right rt
  • Comparable element int npl
  • LeftHeapNode left LeftHeapNode right

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Merge Leftist Heaps
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Merge Leftist Heaps
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Merge Leftist Heaps
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Method merge1
  • private static LeftHeapNode merge1
  • ( LeftHeapNode h1, LeftHeapNode h2 )
  • if( h1.left null ) // Single node
  • h1.left h2 // Other fields in h1 OK
  • else
  • h1.right merge( h1.right, h2 )
  • if( h1.left.npl lt h1.right.npl )
  • swapChildren( h1 )
  • h1.npl h1.right.npl 1
  • return h1

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Method merge
  • public void merge( LeftistHeap rhs )
  • if( this rhs ) return
  • root merge( root, rhs.root )
  • rhs.root null
  • private static LeftHeapNode merge( LeftHeapNode
    h1, LeftHeapNode h2 )
  • if( h1 null ) return h2
  • if( h2 null ) return h1
  • if( h1.element.compareTo( h2.element ) lt 0 )
  • return merge1( h1, h2 )
  • else
  • return merge1( h2, h1 )

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Methods insert, deleteMIn
  • public void insert( Comparable x )
  • rootmerge(new LeftHeapNode(x),root)
  • public Comparable deleteMin( )
  • if( isEmpty( ) ) return null
  • Comparable minItem root.element
  • root merge( root.left, root.right )
  • return minItem

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Applications
  • Event simulation
  • Merge sort

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Event Simulation
  • Events have the scheduled time to happen.
  • Advancing time by clock ticks is too slow.
  • We need to find the next event.
  • So, events are put into heaps with time as the
    element.
  • We choose the next event from the root of the
    heapp.

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Heap Sort
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Heap Sort
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Heap Sort
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Heap Sort
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Heap Sort
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