I am trying to solve this problem..

Given a list of n numbers, we would like to find the smallest and the second smallest numbers from the list. Describe a divide-and-conquer algorithm to solve this problem. Assume that n = 2^k for an integer k. The number of comparisons using your algorithm should not be more than 3n/2 − 2, even in the worst case.

My current solution is to use select algorithm to get the median and then divide the list into L1( contains element less than or equal to the median), R ( median), L2 ( contains all the elements grater than median). Is it correct? If so, what should I do next?

`partition`

works. – Shashank Oct 17 '13 at 1:17