# Heap Sort: how to sort?

I'm trying to implement Heap Sort in Python, but I can't seem to get it right. I've tried to implement this pseudo code, but my code does not sort! It just sifts to ridiculous effect. I'm inclined to think that the problem is in this line:

swap the root(maximum value) of the heap with the last element of the heap

How do I get the maximum value?

That is what I have:

``````def my_heap_sort(sqc):
def heapify(count):
start = (count-2)/2
while start >= 0:
sift_down(start, count-1)
start -= 1

def swap(i, j):
sqc[i], sqc[j] = sqc[j], sqc[i]

def sift_down(start, end):
root = start

while (root * 2 + 1) <= end:
child = root * 2 + 1
temp = root
if sqc[temp] < sqc[child]:
temp = child+1
if temp != root:
swap(root, temp)
root = temp
else:
return

count = len(sqc)
heapify(count)

end = count-1

while end > 0:
swap(end, 0)
end -= 1
sift_down(0, end)
``````

And I found an example with almost the same problem:

``````def heap_sort_example(a):
def heapify(a):
start = (len(a) - 2) / 2
start -= 1

def sift_down(a, start, end):
root = start
while root * 2 + 1 <= end:
child = root * 2 + 1
if child + 1 <= end and a[child] < a[child+1]:
child += 1
if child <= end and a[root] < a[child]:
a[root], a[child] = a[child], a[root]
root = child
else:
return

heapify(a)
end = len(a) - 1
while end > 0:
a[end], a = a, a[end]
sift_down(a, 0, end-1)
end -= 1
``````

The results are different, but both are ridiculous:

``````>>> my_heap_sort(sqc)
[2, 7, 1, -2, 56, 5, 3]

>>> heap_sort_example(sqc)
[-2, 1, 7, 2, 56, 5, 3]
``````

How do I get the maximum value? You don't need to "get" it. The root is exactly the maximum, that's a defined property of a heap.

If you feel tough to understand heap sort, this chapter will be extremely helpful.

I rewrote your code:

``````def swap(i, j):
sqc[i], sqc[j] = sqc[j], sqc[i]

def heapify(end,i):
l=2 * i + 1
r=2 * (i + 1)
max=i
if l < end and sqc[i] < sqc[l]:
max = l
if r < end and sqc[max] < sqc[r]:
max = r
if max != i:
swap(i, max)
heapify(end, max)

def heap_sort():
end = len(sqc)
start = end // 2 - 1 # use // instead of /
for i in range(start, -1, -1):
heapify(end, i)
for i in range(end-1, 0, -1):
swap(i, 0)
heapify(i, 0)

sqc = [2, 7, 1, -2, 56, 5, 3]
heap_sort()
print(sqc)
``````

It gives:

``````[-2, 1, 2, 3, 5, 7, 56]
``````

If you have push and pop, or are using built-in heapq lib, try documented solution:

``````from heapq import heappush, heappop
def heapsort(iterable):
h = []
for value in iterable:
heappush(h, value)
return [heappop(h) for i in range(len(h))]

heapsort([1, 3, 5, 7, 9, 2, 4, 6, 8, 0])
[0, 1, 2, 3, 4, 5, 6, 7, 8, 9]
``````

selection sort is a relatively straight forward sorting algorithm: traverse an array, extract the minimun of the first n elements , then extract min of the next n-1 elements ...... Now this would be O(n^2) algorithm.

Since you are always extracting a min you should think of using a minimum Heap. it extracts a min in O(log n) time. extracting the min n times leads to O(n*log n) time.

so for heap sort one just needs to build a heap (heapify O(n)) and the traverse the array and extract the min n times.

you can use the python heap to build a heap or build your own.

``````def heapsort(l):
hp = make_heap(l)
for i in range(len(l)):
yield hp.extract_min()
``````
• I see it useless to use the built-in library without knowledge of the algorithms. What if tomorrow I will have to write it in another language, which is not provided for such a possibility? – I159 Dec 29 '12 at 11:06

I find that the different implementations of heapify, the "heart" of heap sort are not clear on the internetz. Here is my humble attempt to help the community by adding a simple but clear example of "heapify". I use vectors to avoid the extra confusion of array manipulation.

This method heapifies 1 cell of the array. To heapify the whole array you need a loop, run it from middle of array, moving to beginning. The returned vector MUST be the same one we send in the next iteration, otherwise it's a mess. eg:

``````for (int i = myvector.size()/2; i >= 0; i--) { in = Heapify(in, i);}

vector_of_int Sort::Heapify(vector_of_int in_vector, int in_index)
{

int min_index = in_index; // Track index of smallest out of parent and two children.
int left_child_index = 0;
int right_child_index = 0;
int vector_size = in_vector.size();

left_child_index = LeftChildIndex(in_index);// index of left child, at position 2*in_index
right_child_index = left_child_index + 1;// index of right child, at position 2*in_index + 1

// If left_child_index is not overflowing, suggest swap...
if ((left_child_index) < vector_size)
{
// If parent larger than left child, min_index remembers left child position
if (in_vector[min_index] > in_vector[left_child_index])
{ min_index = left_child_index; }
}

// If right_child_index is is not overflowing, suggest swap...
if (right_child_index < vector_size)
{
// If parent larger than right child, min_index remembers right child position
if (in_vector[min_index] > in_vector[right_child_index])
{ min_index = right_child_index; }
}

// Now min_index has the index of the smallest out of parent and it's two children.
// If the smallest is not the parent, swap parent and smallest.
if (min_index != in_index)
{
in_vector = swap(in_vector, in_index ,min_index);
in_vector = Heapify(in_vector, min_index); // RECURSION IS HERE
}

return in_vector;
}
// End heapify
``````

I found it and almost figured how it works:

``````def heapsort(sqc):
def down_heap(sqc, k, n):
parent = sqc[k]

while 2*k+1 < n:
child = 2*k+1
if child+1 < n and sqc[child] < sqc[child+1]:
child += 1
if parent >= sqc[child]:
break
sqc[k] = sqc[child]
k = child
sqc[k] = parent

size = len(sqc)

for i in range(size/2-1, -1, -1):
down_heap(sqc, i, size)

for i in range(size-1, 0, -1):
sqc, sqc[i] = sqc[i], sqc
down_heap(sqc, 0, i)
``````

# edit:

This implementation is written based on my own understanding of the algorithm. It is longer, but to me this algorithm is much clearer in this implementation. Long naming is help when you need to understand the algorithm, so I left intact all the long names.

``````def heapsort(sequence):
sequence_length = len(sequence)

def swap_if_greater(parent_index, child_index):
if sequence[parent_index] < sequence[child_index]:
sequence[parent_index], sequence[child_index] =\
sequence[child_index], sequence[parent_index]

def sift(parent_index, unsorted_length):
index_of_greater = lambda a, b: a if sequence[a] > sequence[b] else b
while parent_index*2+2 < unsorted_length:
left_child_index = parent_index*2+1
right_child_index = parent_index*2+2

greater_child_index = index_of_greater(left_child_index,
right_child_index)

swap_if_greater(parent_index, greater_child_index)

parent_index = greater_child_index

def heapify():
for i in range((sequence_length/2)-1, -1, -1):
sift(i, sequence_length)

def sort():
count = sequence_length
while count > 0:
count -= 1
swap_if_greater(count, 0)
sift(0, count)

heapify()
sort()
``````

# edit:

And optimized version:

``````def opt_heapsort(s):
sl = len(s)

def swap(pi, ci):
if s[pi] < s[ci]:
s[pi], s[ci] = s[ci], s[pi]

def sift(pi, unsorted):
i_gt = lambda a, b: a if s[a] > s[b] else b
while pi*2+2 < unsorted:
gtci = i_gt(pi*2+1, pi*2+2)
swap(pi, gtci)
pi = gtci
# heapify
for i in range((sl/2)-1, -1, -1):
sift(i, sl)
# sort
for i in range(sl-1, 0, -1):
swap(i, 0)
sift(0, i)
``````

Heap sort example with example of how to initially build a heap

``````def findMin(heapArr,i,firstChildLoc,secondChildLoc):
a = heapArr[i]
b = heapArr[firstChildLoc]
c = heapArr[secondChildLoc]
return i if ((a < b) and (a < c)) else firstChildLoc if (b < c) else secondChildLoc

def prelocateUp(heapArr):
l = len(heapArr)
i = l-1
while True:
parentLoc = (i+1)/2 - 1
if parentLoc >= 0:
if heapArr[parentLoc] > heapArr[i]:
temp = heapArr[parentLoc]
heapArr[parentLoc] = heapArr[i]
heapArr[i] = temp
else :
break
i = parentLoc
return heapArr

def prelocateDown(heapArr):

l = len(heapArr)
i = 0

while True:
firstChildLoc = 2*(i+1) - 1
secondChildLoc = 2*(i+1)
if (firstChildLoc > l-1):
break

elif (secondChildLoc > l-1):
if heapArr[i] > heapArr[firstChildLoc]:
temp = heapArr[i]
heapArr[i] = heapArr[firstChildLoc]
heapArr[firstChildLoc] = temp
break

else :
minLoc = findMin(heapArr,i,firstChildLoc,secondChildLoc)
if minLoc !=i:
temp = heapArr[i]
heapArr[i] = heapArr[minLoc]
heapArr[minLoc] = temp
i = minLoc
else :
break
return heapArr

def heapify(heapArr,op):
if op==1:
heapArr = prelocateUp(heapArr)
else :
heapArr = prelocateDown(heapArr)
return heapArr

def insertHeap(heapArr,num):
heapArr.append(num)
heapArr = heapify(heapArr,1)
return heapArr

def getMin(heapArr):
ele = heapArr
heapArr = heapArr[-1]
heapArr.pop(-1)
heapArr = heapify(heapArr,2)
return ele,heapArr

a=[5,4,8,2,6]
heapArr = []
for i in xrange(0,len(a)):
heapArr = insertHeap(heapArr,a[i])

#No
sortedArr = []
for i in xrange(0,len(a)):
[ele,heapArr] = getMin(heapArr)
sortedArr.append(ele)
print sortedArr
``````