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Square Subsequence

I have been trying to solve the "Square Subsequences" problem on interviewstreet.com:

A string is called a square string if it can be obtained by concatenating two copies of the same string. For example, "abab", "aa" are square strings, while "aaa", "abba" are not.

Given a string, how many subsequences of the string are square strings?

I tried working out a DP solution, but this constraint seems impossible to circumvent: `S will have at most 200 lowercase characters (a-z)`

.

From what I know, finding all subsequences of a list of length `n`

is ** O(2^n)**, which stops being feasible as soon as

`n`

is larger than, say, 30.Is it really possible to systematically check all solutions if `n`

is 200? How do I approach it?