Problem link: http://mirror.codeforces.com/contest/479/problem/C
AC submission (using map): http://mirror.codeforces.com/contest/479/submission/16772060
WA submission (sorting a vector): http://mirror.codeforces.com/contest/479/submission/16772083
I used a greedy approach in the WA submission. It's possible to take any exam scheduled to the day A before day A. Suppose that the in the final solution for the problem all the exams scheduled to the day A are taken before A. If this is true, the last exam will be completed in the greatest number B, such that B is smaller than A, within all elements in the set of exams scheduled to the day A. This greedy step translates to code like this:
auto at = mp.find(a);
if(at != mp.end()) {
at->second = max(at->second, b);
}
else {
mp[a] = b;
}
If this step is not possible, consider the first element C > A such that mp[C] < mp[A], so I cant take exam C in the day mp[C]. So the next minimum value available is C. This step is done in nom-increasing order of A. But I got WA with this solution and have no ideia why.