# Python program for implementation of heap Sort # To heapify subtree rooted at index i. # n is size of heap def heapify(arr, n, i): largest = i # Initialize largest as root l = 2 * i + 1 # left = 2*i + 1 r = 2 * i + 2 # right = 2*i + 2 # See if left child of root exists and is # greater than root if l < n and arr[i] < arr[l]: largest = l # See if right child of root exists and is # greater than root if r < n and arr[largest] < arr[r]: largest = r # Change root, if needed if largest != i: arr[i], arr[largest] = arr[largest], arr[i] # swap # Heapify the root. heapify(arr, n, largest) # The main function to sort an array of given size def heapSort(arr): n = len(arr) # Build a maxheap. # Since last parent will be at ((n//2)-1) we can start at that location. for i in range(n // 2 - 1, -1, -1): heapify(arr, n, i) # One by one extract elements for i in range(n - 1, 0, -1): arr[i], arr[0] = arr[0], arr[i] # swap heapify(arr, i, 0) # Driver code to test above arr = [12, 11, 13, 5, 6, 7] heapSort(arr) n = len(arr) print("Sorted array is") for i in range(n): (print("%d" % arr[i]),)