heap data strcuture java code example
Example 1: heap
A heap is a tree-based data structure in which all the nodes of the tree are in a specific order. For example, if is the parent node of , then the value of follows a specific order with respect to the value of and the same order will be followed across the tree.
Example 2: heaps in java
public class BinaryHeap {
private static final int d= 2;
private int[] heap;
private int heapSize;
/**
* This will initialize our heap with default size.
*/
public BinaryHeap(int capacity){
heapSize = 0;
heap = new int[ capacity+1];
Arrays.fill(heap, -1);
}
/**
* This will check if the heap is empty or not
* Complexity: O(1)
*/
public boolean isEmpty(){
return heapSize==0;
}
/**
* This will check if the heap is full or not
* Complexity: O(1)
*/
public boolean isFull(){
return heapSize == heap.length;
}
private int parent(int i){
return (i-1)/d;
}
private int kthChild(int i,int k){
return d*i +k;
}
/**
* This will insert new element in to heap
* Complexity: O(log N)
* As worst case scenario, we need to traverse till the root
*/
public void insert(int x){
if(isFull())
throw new NoSuchElementException("Heap is full, No space to insert new element");
heap[heapSize++] = x;
heapifyUp(heapSize-1);
}
/**
* This will delete element at index x
* Complexity: O(log N)
*
*/
public int delete(int x){
if(isEmpty())
throw new NoSuchElementException("Heap is empty, No element to delete");
int key = heap[x];
heap[x] = heap[heapSize -1];
heapSize--;
heapifyDown(x);
return key;
}
/**
* This method used to maintain the heap property while inserting an element.
*
*/
private void heapifyUp(int i) {
int temp = heap[i];
while(i>0 && temp > heap[parent(i)]){
heap[i] = heap[parent(i)];
i = parent(i);
}
heap[i] = temp;
}
/**
* This method used to maintain the heap property while deleting an element.
*
*/
private void heapifyDown(int i){
int child;
int temp = heap[i];
while(kthChild(i, 1) < heapSize){
child = maxChild(i);
if(temp < heap[child]){ heap[i] = heap[child]; }else break; i = child; } heap[i] = temp; } private int maxChild(int i) { int leftChild = kthChild(i, 1); int rightChild = kthChild(i, 2); return heap[leftChild]>heap[rightChild]?leftChild:rightChild;
}
/**
* This method used to print all element of the heap
*
*/
public void printHeap()
{
System.out.print("nHeap = ");
for (int i = 0; i < heapSize; i++)
System.out.print(heap[i] +" ");
System.out.println();
}
/**
* This method returns the max element of the heap.
* complexity: O(1)
*/
public int findMax(){
if(isEmpty())
throw new NoSuchElementException("Heap is empty.");
return heap[0];
}
public static void main(String[] args){
BinaryHeap maxHeap = new BinaryHeap(10);
maxHeap.insert(10);
maxHeap.insert(4);
maxHeap.insert(9);
maxHeap.insert(1);
maxHeap.insert(7);
maxHeap.insert(5);
maxHeap.insert(3);
maxHeap.printHeap();
maxHeap.delete(5);
maxHeap.printHeap();
}
}