Comparison based sorting is big omega of ** nlog(n)**, so we know that mergesort can't be

**. Nevertheless, I can't find the problem with the following proof:**

*O(n)*Proposition ** P(n)**: For a list of length

**, mergesort takes**

*n***time.**

*O(n)** P(0)*: merge sort on the empty list just returns the empty list.

Strong induction: Assume ** P(1), ..., P(n-1)** and try to prove

**. We know that at each step in a recursive mergesort, two approximately "half-lists" are mergesorted and then "zipped up". The mergesorting of each half list takes, by induction,**

*P(n)***. The zipping up takes**

*O(n/2) time***time. So the algorithm has a recurrence relation of**

*O(n)***which is**

*M(n) = 2M(n/2) + O(n)***which is**

*2O(n/2) + O(n)***.**

*O(n)*