# Is there a specific algorithm for these kinds of problems?

I came across a couple of similar problems where there are a couple of items in the set ei = {wi,hi} for `i=0..n`, you have to find the longest series such that wm > wm+1 and hm > hm+1 for each succesive value of `m`. Does it sound familiar? Can anyone point out a specific algorithm that may have dealt with similar problems?

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Longest increasing subsequence with various partial orders. –  Per Dec 14 '11 at 16:22
@Per this isn't exactly longest common subsequence, because e1=(3,4),e2=(2,5) has no relation (not <,>,=) so you can't use binary search on it. Or any other well known comparison based method. –  Saeed Amiri Dec 14 '11 at 18:03

One way to do it is to build a directed acyclic graph that has a node for each ei and an edge from ei to ej iff ej > ei (in the sense you state above). Then find the longest path in this DAG.

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+1 nice answer. –  Saeed Amiri Dec 14 '11 at 18:00
When you implement this, you'll need to write your own Comparator method that says `e_i < e_j` if and only if `w_i < w_j` and `h_i < h_j`. The fact that you have a partial order instead of a total order does not change the algorithm.