Say we're given a hash table of size m, and at each bucket we store a hash table of size p.

Average case search complexity, assuming simple uniform hashing gives us **O(n/m)** average case search complexity, where **n/m** is the load factor.

And if I'm not mistaken, worst case complexity should be O(mp), which is equivalent to O(n).

I've plotted the search complexity for a hash table **O(log n)** with an AVL tree stored at each bucket as well. My dilemma here is how to compute and plot the average case search complexity of this for varying sizes of p = [10, 100, or 1000] and n = [0, 10000000]?

I've come up with strictly linear plots which I think are completely wrong since they should at some point converge with the AVL charted line (From the initial problem description). Can anyone give me some insight?

`O(n)`

and`O(n/m)`

, both linear. Why would you expect the graphs of these things to be curved? – Patrick87 Jul 3 '12 at 5:30