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I need to know what the Big O time of my binary heap code is, and how can I improve it?

Here's the code:

public static void CreateMaxHeap(int[] a)
{
    for (int heapsize = 0; heapsize < a.Length; heapsize++)
    {
        int n, p;
        n = heapsize;
        while (n > 0)
        {
            p = (n - 1) / 2;
            if(a[n]>a[p])
                Swap(a,n,p);
            n = p;
        }
    }
} // end of create heap
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1  
Have what have you tried? Do you have any ideas? We're not just going to do your homework for you. –  rlbond Jul 11 '09 at 19:16
2  
12 milliseconds –  Dario Jul 11 '09 at 19:17
    
what does swap do exactly? –  Victor Jul 11 '09 at 19:18
    
ha ha..I mean Big O......... Yaa i tried I think its O(nlogn), as I am using top down approach to create a binary heap from an array –  Learner Jul 11 '09 at 19:18
    
swaps the array elements –  Learner Jul 11 '09 at 19:19

1 Answer 1

up vote 5 down vote accepted

it's O(nlgn)

you iterate through the entire array that takes O(n). but every iteration you go back through the array by dividing by 2 repeatedly. so every iteration you're adding the lgn to it which is log base 2 of n.

as for making it better, the first thing i see is that when heapsize is zero, nothing happens. that's kindof wasteful of resources... so maybe start at 1. that's all.

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Cool...I got it....how can I make it better. This talks about en.wikipedia.org/wiki/Heapsort....here there is a bottom up approach which it says that it runs in O(n) time....but I am not able to understand how? –  Learner Jul 11 '09 at 19:36
    
you don't understand how it's O(n) or you don't understand how to implement it? –  Victor Jul 11 '09 at 19:45
    
@Learner - Where does it say that it's O(n)? The article mentions smoothsort, which is still O(nlgn), but gets close to O(n) if the input is somewhat sorted already. –  Cypher2100 Jul 11 '09 at 19:58
    
thisThe heapify function can be thought of as building a heap from the bottom up, successively shifting downward to establish the heap property. An alternative version (shown below) that builds the heap top-down and shifts upward is conceptually simpler to grasp. This "siftUp" version can be visualized as starting with an empty heap and successively inserting elements. However, it is asymptotically slower: the "siftDown" version is O(n), and the "siftUp" version is O(n log n) in the worst case. The heapsort algorithm is O(n log n) overall using either version of heapify. is what article says –  Learner Jul 11 '09 at 20:01
1  
The O(n) relays on the fact that the you are doing O(n) actions, but not all of them are ln(n) some are shorter actions, if you do the math, it can be proven to be O(n). There's a prove on amazon.com/Introduction-Algorithms-Thomas-H-Cormen/dp/… –  Liran Orevi Jul 11 '09 at 20:11

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