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algorithm - Number of all increasing subsequences in given sequence?

You may have heard about the well-known problem of finding the longest increasing subsequence. The optimal algorithm has O(n*log(n))complexity.

I was thinking about problem of finding all increasing subsequences in given sequence. I have found solution for a problem where we need to find a number of increasing subsequences of length k, which has O(n*k*log(n)) complexity (where n is a length of a sequence).

Of course, this algorithm can be used for my problem, but then solution has O(n*k*log(n)*n) = O(n^2*k*log(n)) complexity, I suppose. I think, that there must be a better (I mean - faster) solution, but I don't know such yet.

If you know how to solve the problem of finding all increasing subsequences in given sequence in optimal time/complexity (in this case, optimal = better than O(n^2*k*log(n))), please let me know about that.

In the end: this problem is not a homework. There was mentioned on my lecture a problem of the longest increasing subsequence and I have started thinking about general idea of all increasing subsequences in given sequence.

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I don't know if this is optimal - probably not, but here's a DP solution in O(n^2).

Let dp[i] = number of increasing subsequences with i as the last element

for i = 1 to n do
    dp[i] = 1
    for j = 1 to i - 1 do
        if input[j] < input[i] then
            dp[i] = dp[i] + dp[j] // we can just append input[i] to every subsequence ending with j

Then it's just a matter of summing all the entries in dp


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