Heap Sort has a worst case complexity is O(nlog) n wnile Quicksort is O(n^2). But emperical evidences say quicksort is superior. Why is that??

One of the major factors is that quicksort has better locality of reference  the next thing to be accessed is usually close in memory to the thing you just looked at. By contrast, heapsort jumps around significantly more. Since things that are close together will likely be cached together, quicksort tends to be faster. However, quicksort's worstcase performance is significantly worse than heapsort's is. Because some critical applications will require guarantees of speed performance, heapsort is the right way to go for such cases. 


Here's a couple explanations: http://www.cs.auckland.ac.nz/software/AlgAnim/qsort3.html http://users.aims.ac.za/~mackay/sorting/sorting.html Essentially, even though the worst case for quick sort is O(n^2) it on average will perform better. :) 


The bigO notation means that the time required to sort n items is bounded above by the function



Averagecase complexity, and the fact that you can take simple steps to minimize the risk of worstcase complexity in Quicksort (e.g. select the pivot as a median of three elements rather than a single selected position). 

