You are given a set of n jobs. Each job is associated with a starting time and an ending time, both represented as integers, and the profit you would make from it. You have to determine which jobs to take to maximize profit, keeping in mind that only one job can be done at any one time. Is there an algorithm for this with better than O(n^{2}) efficiency?
closed as off topic by Sergey K., ЯegDwight, Florent, Rody Oldenhuis, S.L. Barth Oct 3 '12 at 11:30Questions on Stack Overflow are expected to relate to programming within the scope defined by the community. Consider editing the question or leaving comments for improvement if you believe the question can be reworded to fit within the scope. Read more about reopening questions here.If this question can be reworded to fit the rules in the help center, please edit the question. 

The algorithm : Given set S = {I1,I2,...,In}:
Now we have ordered set {J1,J2,...,Jn}. (with W1,W2,...,Wn as profits) We define a(i) as the minimum index k, such start time of Jk is higher than the end time of Ji. Return 1 if noone exist. Denote D[i] as the maximum profit (as you described) on the set {Ji,Ji+1,...,Jn}. So we get:
RunTime: Sorting n intervals  O(nlogn). Construct D  O(n). Overall runtime = O(nlogn). 


The problem you describe is called weighted interval scheduling and can be solved in O(nlogn) steps  or even O(n) if jobs are already sorted. Quick Google search will give you all the information you'll need about it. 


O(n^2)
? – elyashiv Oct 3 '12 at 6:25