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There is an array of integers ,I have to find the number of sequences of K length having range (max - min of the subsequence) less than equal to R .Is there a relation between Number of sequences of length k and number of sequences of length K-1 ? I am trying to solve a practice question on SPOJ. I don't want the full solution,just point me in the right direction /suggestion/hint.

I was thinking of a deque like structure to maintain min and max elements of the array upto a certain index.However,when k is closer to n ,this would become close to o(n*n) which is too slow ,I am ideally looking at O(n) solution or O(n * log n) solution. It would be best if I can calculate the required value for K=1 to K=N using a recursion/iteration relation as the same answer maybe required again

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Please post an example and define what do you mean by "range". –  dotNET Oct 14 '12 at 13:18
    
Range most likely means max - min. –  IVlad Oct 14 '12 at 13:23
    
@IVlad:sir you are correct ,range means max element -min element of the sequence selected –  user1724072 Oct 14 '12 at 13:25
    
I don't have an answer, but it might be interesting to try to beat O(N*N) for an algorithm which just finds the number of qualifying ranges of length K = N/2. And then maybe that could hint at an algorithm for the complete problem. –  aschepler Oct 14 '12 at 13:36
    
Can you please add a link to SPOJ. –  iccthedral Oct 14 '12 at 13:59

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This is a perfect application for a deque. See my answer here.

You should be able to adapt that for your needs with almost no changes, giving you an O(N) solution.

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:What if I have to calculate this value from K=1 to K=N ,what will be the complexity in that case.And what algorithm can I use ? –  user1724072 Oct 14 '12 at 13:29
    
@user1724072 If you apply the same algorithm for each K, it will be O(n^2), because the algorithm for a fixed K is O(N). Do you want to count the number of substrings of length 1, 2, ..., N with range <= R? That is a different question, I suggest you open another question for that problem. –  IVlad Oct 14 '12 at 13:33

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