# longest increasing subsequence of a set of disjoint decreasing sequences

Lets say we have some disjoint decreasing sequences:

``````s1={10,8,2}
s2={9,5,4,1}
s3={7,6,3}
``````

I select some decreasing sequences (say 5 decreasing sequences in the order `s2`,`s1`,`s2`,`s3`,`s2`) and concatenate them (resulting sequence `S = {9,5,4,1,10,8,2,9,5,4,1,7,6,3,9,5,4,1}`.

Now I want to find the length of the longest increasing subsequence in S. In the above example: `5` -> `{1,2,4,7,9}`

Expected Time Complexity is less than O(|S|).

• The best solution if the numbers are random is in `O(|S|*log(|S|))` using dynamic programming. You can try to start from there and add some restrictions according to your decreasing order. For instance, you can "remove" `9, 5, 4` (beginning) and `5, 4, 1` (end). Also, don't iterate normally through the sequence, because when you take `1`, you need to find the lowest number from the second sequence that is bigger than `1` ... I mean start from right to left in the next sequence `2` - `8` - `10`. – ROMANIA_engineer Oct 5 '14 at 9:12
• You cannot do better than ` `O(|S|*log(|S|))`; if you could you would be able to solve the unrestricted LIS problem simply by assuming `s_i={S[i]}` (all single-element subsequences). You need to set up further restrictions. – n. 'pronouns' m. Oct 5 '14 at 9:17
• I can't seem to think of any solution better than O(|S| * log(k)) where k is the average size of the decreasing sequences. Though it might be useful to use some sort of line sweep type algorithm. – Nuclearman Oct 8 '14 at 7:22