# Longest Increasing Subsequence (LIS) with two numbers

How to find the length of LIS using two numbers. For example, [(1,2) (7,8) (3,4) (5,6)] In the above array sequence, the length of LIS would be 3. i.e, [(1,2) (3,4) (5,6)] Any idea?

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You could use any algorithm for the standard LIS problem, with two modifications:

1. Discard any pairs where the second number isn't strictly greater than the first number.
2. The comparison operator for pairs A and B (i.e. `A < B`) needs to compare the second number of A to the first number of B.
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What would be your solution to [(1,2),(0,1),(5,2),(7,3),(2,3),(10,5)]? –  MAK Jan 4 '12 at 2:09

I'm not sure what you're asking but I'll assume what you mean is that a pair (a,b) is less than another pair (c,d) if and only if a < b and c < d.

This can be easily solved in O(N^2) time by adapting the standard dynamic programming technique, which is described in another SO thread.

The classic O(N log N) solution to the standard LIS problem (check Wikipedia; I would post another link here but I don't have enough reputation) can be extended to give a subquadratic solution to the LIS problem with pairs, with some difficulty. We cannot simply remember one minimum value for every possible length; we have to maintain "staircase-like" structures containing all minimal pairs for each length, that is, up to N copies of the data structure described here, implemented using an ordered dynamic set of pairs keyed on the first member. We can then query one copy of this structure in O(log N) time (to check whether it contains any pair less than the current pair), giving O(log^2 N) time for the binary search step, and O(N log^2 N) time in all. This is the fastest solution I know to the problem.

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I think you can use the standard LIS algorithm with the small exception that -

when you compare index i with index i+1 - compare the upper value of i with the lower value of i+1.

EDIT: This is of course assuming that all the ranges have the lower number first and the upper number next.

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Model the problem as a graph. Each tuple can be a node. A directed edge exists from one node to another if the first tuple is strictly less than the second one (here "less" means both values of the tuple are less).

The longest increasing subsequence is now the longest path in this graph. Notice that there can be no cycles in this graph (i.e. it is a DAG). The longest path in a DAG can be found by dynamic programming (see wikipedia).

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Proceed as we do in case finding LIS of simple array. Just beside doing only one comparison, do compare both element. It will give LIS with O(n^2) time complexity.

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Provided the first and second number in the tuples themselves are always ascending (which seems to be the case from your example) this in principle should not be different from regular LIS algorithm besides some minor modifications: Just increase the maximum LIS up to the current tuple for which the last number is less than the first number of the current tuple. Use dynamic programming to cache maximum LIS and predecessor tuple for each sequence spot.

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why the downvote? –  BrokenGlass Jan 3 '12 at 18:40

You will have to find the LIS first and then calculate its cardinality

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