# Heapsort algorithm performing poorly compared to another

I have two `heapsort` algorithms. The first one is written by me, while the 2nd one is taken from some website. According to me, both have the same logic, but the 2nd one is performing way better than the first. Any reason why is this happening? The only difference I can see is that mine uses a recursion, while the other one does it iteratively. Can that alone be the differentiating factor?

My code:

``````def heapify(arr,i,n):
pivot = arr[i]   #the value of the root node
left,right = (i<<1)+1,(i<<1)+2  #indices of the left and right subtree root nodes
if right <= n-1:  #if right is within the array, so is left
if arr[left] <= pivot and arr[right] <= pivot:
return  #if both are less than the root node, it's already heapified
maximum = left if arr[left] >= arr[right] else right #else find which child has a higher value
arr[maximum],arr[i] = arr[i],arr[maximum]  #swap the root node with that child
return heapify(arr,maximum,n)  #make the changed child the new root and recurse
else:
if left <= n-1:  #right is outside the array, so check for left only
if arr[left] <= pivot:
return
arr[i],arr[left] = arr[left], arr[i]  #same logic as above
return heapify(arr,left,n)
else:
return

def heapit(array,n):
for i in range((len(array)-1)/2,-1,-1):  #all elements after (len(array)-1)/2 are the leaf nodes, so we have to heapify earlier nodes
heapify(array,i,n)

def heapsort(array):
n = len(array)
for i in range(n,0,-1):
heapit(array,i)  #make the array a heap
array[0],array[i-1] = array[i-1],array[0]  #swap the root node with the last element
``````

The other code:

``````def HeapSort(A):
def heapify(A):
start = (len(A) - 2) / 2
while start >= 0:
siftDown(A, start, len(A) - 1)
start -= 1

def siftDown(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[0] = A[0], A[end]
siftDown(A, 0, end - 1)
end -= 1
``````

Even for small array with size about 100,000, the difference becomes substantial. I am invoking either code through just passing the array to be sorted to the function: `HeapSort(list)` or `heapsort(list)`.

Edit:

I have replaced the `heapsort` function by this one:

``````def heapsort(array):
n = len(array)
heapit(array,n)
array[n-1],array[0] = array[0],array[n-1]
for i in range(n-1):
heapify(array,0,n-1-i)
array[n-i-2],array[0] = array[0],array[n-i-2]
``````

This gives a comparable performance, but it is still slower. For a 1 million dollar array, the results are almost 20 seconds : 4 seconds. What else can be done?

-
On what sized? Did you statistically check it is indeed the case? If it is - the usual immidiate suspect is cache efficiency. –  amit Sep 20 '12 at 11:24
What is the performance difference by actual time for the same 100,000? –  aneroid Sep 20 '12 at 11:26
Both algorithms follow similar logic, so I guess the cache inefficiency will apply to them both. Regarding the size, I tested with just a 10,000 element list. Mine took almost 40 seconds, while the other took less than a second. –  Cupidvogel Sep 20 '12 at 11:26
For 100,000 my program doesn't return the prompt for almost 15 minutes, so I just killed it! The other one took around 10 seconds. –  Cupidvogel Sep 20 '12 at 11:27
Your function names are confusing. Is your "heapify" algorithm supposed to be the "trickle-down" step of heapifying? –  larsmans Sep 20 '12 at 11:42

EDIT: my remarks below might explain a major slowdown, but the most important thing is that your algorithm is not heapsort.

Inside the function `heapsort`, you perform a loop `for i in range(n,0,-1)`. That's `n` iterations where `n` is the size of your input. Inside that loop, you call `heapit`, which loops `for i in range((len(array)-1)/2,-1,-1)`; that's roughly `n//2` iterations.

`n * (n // 2)` = Θ(`n`²). In other words, you have an algorithm that takes at least quadratic time, while the second algorithm implements the true heapsort, that runs in O(`n` lg `n`) time.

/EDIT

It's very likely the recursion that's killing performance, in combination with the calling of functions defined at the module level. Python (CPython at least) is not optimized for recursive programs, but for iterative ones. For every recursive call in `heapify`, CPython has to perform the following seven byte code instructions:

``````  9         158 LOAD_GLOBAL              0 (heapify)
170 CALL_FUNCTION            3
173 RETURN_VALUE
>>  174 POP_TOP
``````

(determined using `dis`). The final two instructions are performed after the recursive call has finished, because Python does not perform tail call optimization.

While this may not look expensive, a `LOAD_GLOBAL` has to do at least one hash table lookup just to find `heapify`, and the reference counts for `heapify`, `arr`, `maximum` and `i` have to be incremented. When the recursive call finishes, the reference counts have to be decremented again. Function calling is pretty expensive in Python.

As `import this` says, "flat is better than nested": prefer iteration over recursion whenever possible.

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Interesting, and a good answer. Can it be THAT significant? (difference from 40 secs to 15+ mins?) Or is it only a part of the problem in your opinion, based on your personal experience in python? –  amit Sep 20 '12 at 12:07
Exactly. Same question here, can it be THAT significant? –  Cupidvogel Sep 20 '12 at 12:32
@amit: It may be only part of the problem; when I disassemble the second program, there are no `LOAD_GLOBAL` instructions in the loops, which can also be performance killers. Note that 40s vs. 15min (assuming the program was about to finish) is just one order of magnitude difference (a factor of 22.5), so a few optimization tricks should be enough to get such a speedup over a naive program. –  larsmans Sep 20 '12 at 12:34
@Cupidvogel: I just spotted one more thing. Are you on Python 2 or 3? –  larsmans Sep 20 '12 at 12:37
Python 2.7. Can even that be a factor? –  Cupidvogel Sep 20 '12 at 12:38