Finding non-decreasing subsequence is well known problem. But this Question is a slight variant of the finding longest non-decreasing subsequence. In this problem we have to find the length of longest subsequence which comprises 2 disjoint sequences 1. non decreasing 2. non-increasing. e.g. in string "aabcazcczba" longest such sequence is aabczcczba. aabczcczba is made up of 2 disjoint subsequence aabcZccZBA. (capital letter shows non-increasing sequence)
My algorithm is
length = 0 For i = 0 to length of given string S let s' = find the longest non-decreasing subsequence starting at position i let s" = find the longest non-increasing subsequence from S-s'. if (length of s' + length of s") > length length = (length of s' + length of s") enter code here
But I am not sure whether this would give correct answer or not. Can you find a bug in this algo and if there is bug also suggest correct algorithm. Also I need to optimize the solution. My algorithm would take roughly o(n^4) steps.