The following problem was given as an assingment in Introduction to algorithms course:
You are given n intervals on real line (integer coordinates) and you have to choose a subset M such that at most k intervals from this subset pairwise intersect (intersection at endpoints doesn't count). Weight wi of the interval [si, ei] is defined as ei - si. The goal is to find a subset M with maximal sum of interval weights.
I am aware of a solution of a more general problem, where weights of intervals can be arbitrary. But since this problem was presented at Introduction of algorithms course I guess there has to be a simpler solution for this more specific case.
Any hints would be very appreciated. :)