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Given a set of numbers and a number k, find the maximum sum such that if you pick a number at index i you should not pick any number from index i - K to index i + K.

This problem was asked in google to my friend. I am not able to figure out a solution better then a naive O(n^2).

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2 Answers 2

up vote 4 down vote accepted

You can do this in O(n) by keeping track of the maximum of all values seen in the first i-K-1 entries in the array.

Python code:

for i in xrange(K+1,len(A)):
    m=max(A[i-K-1],m) # stores maximum of values in A[0],A[1],...,A[i-K-1]
print bestsum

For each index i we combine A[i] with m which is the highest value seen in the initial values of the array A[0],..,A[i-K-1].

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initially m should be max (A[0] to A[k-1]) ? –  aseem Feb 9 at 11:03
it will fail for case : 9 0 12 200 1 9 7 2 and k= 4 –  aseem Feb 10 at 8:35
@anon It gives 18 (formed from 9+9) for that case - what do you think the right answer should be? –  Peter de Rivaz Feb 10 at 8:58
i think 200 if we consider that no element within range of i-k and i+k should be selected –  aseem Feb 10 at 9:01
i am specificaly talking about the case when N < 2*k and you calculate for the first time max(A[0] , A[k+1]) and don't consider any of A[1] to A[k-1] . –  aseem Feb 10 at 9:04

You may be able to modify this http://www.geekviewpoint.com/java/dynamic_programming/positive_subset_sum or http://www.geekviewpoint.com/java/dynamic_programming/max_subarray_sum.

Sorting the array before may not be acceptable for the question

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The question asks for 2 numbers. it is not subset-sum, you do not want subset that sums to k, you want maximum sum of 2 numbers with a restriction that their difference is greater then k. –  amit Jan 22 '13 at 16:55
@amit not the difference its is the index difference if , i is the index then it should not like in (i-k, i+k) –  Peter Jan 22 '13 at 16:56
Oh, I see. Still not subset-sum though. –  amit Jan 22 '13 at 17:03

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