I was asked to solve the following recurrence relation in my homework question , T(n) = T(√n) + T(n - √n) + cn
This is how I solved the same and also got the right answer. But there is an obvious error in my solving. Please point out how to correct my wrong step.
For all n > 4 we have , √n < (n-√n)
Thus the term T(n - √n) will move slowly towards T(1) thus contributing to the height of the recurrence tree.
By simple mathematics we can say that after √n iterations the term T(n - √n) will finally be T(1). (This is where I went wrong. I had thought the terms will reduce as follows, T(n - √n) , T(n - 2√n), T(n - 3√n) but they dont)
Thus the height of the above tree is √n.
Also cost of operation at each level is at the most cn.
Thus total cost of the operation is √n * cn.
Thus the running time of the algorithm is O(n√n)