I have to solve a problem much like the maximum subarray problem. I have to find the largest subarray whose average is bigger than k. I thought the following trick. I can transform my array A[] of size n to a B[] where B[i] = A[i]  k. So now the average must be >0. But average greater than zero doesnt simply mean sum greater than zero? So I can directly apply Kadane's algorithm. Am I right? (always under the constraint that there is 1 positive value)
no, kadane's algorithm will still find you the subarray with the biggest sum...i have to solve the same problem. so far i kave find that if we create the array B as you mentioned above and then make the array C which contains the partial sums of the array B,then the maximum interval (i,j) that we are lookink for has the same number for i and j!!! for example: array A is: 1 10 1 1 4 1 7 2 8 1 .....and the given k is 5 then array B is: 4 5 6 6 1 6 2 3 3 4 array C is:4 1 5 11 12 18 16 19 16 20 so the subarray that we are looking for is [7,2,8], has length 3, and has the same first and last element which is 16!!!! edit: i forgot to tell that we are searching for a O(n) or an O(n*logn) algorithm.... @lets_solve_it you are right but your algorithm is O(n^2) whitch is way to big for the data we want to handle. i 'm close to solve it with the function map in c++,whitch is something like a hash table. i thing this is the right diredtion because here the elements of the array C have direct relation with their indexes! Also our professor told us that another possible solution ,is to make again the array C and then take a (special?) pivot to do quicksort....but i don't totally understand what we expect from quicksort to do. 


@panos7: after you have created array C (partial sums array), you seek two values of C, Ci and Cj, such that, Cj>=Ci, and, (ji) is as "big" as possible. (ji) > MAX. then return ji. in your example, 16>=18 so you returned ji=96=3 which is the correct answer! 

