Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Given an array A of integers and an integer k.Find the kth Minimum Sum of the array.The number of elements can upto 10^5.Also the elements are not distinct.I have tried a brute force algorithm but that is too slow.Need a faster approach.

share|improve this question
What have you tried? What particular issues are you having in solving this problem? –  Zong Zheng Li Jan 12 at 2:41
The orginal question gave me a sub-array of the original array and then i have to find the kth minimum sum of the sub-array.I can only think of an brute force algorithm where we calculate all the sum of the sub array and then sort ,then choose the kth sum. –  user3092832 Jan 12 at 2:43
Have you looked at similar questions such as kth largest sum? –  Zong Zheng Li Jan 12 at 2:45
I cannot look for a pair,the sum can comprise of more than 2 numbers as well –  user3092832 Jan 12 at 2:47
Everything you've tried (and why it failed), everything you've thought of but didn't know how to implement, everything you've gotten working successfully but too slow, these should all be included in the question. That way, you seem like someone who needs a little help (what we're here for) rather than someone who wants us to do all their work for them :-) –  paxdiablo Jan 12 at 2:48

1 Answer 1

You have a maximum of 2^n different sums in an array with n elements. If you can solve your problem, your solution can answer this question:

Find sum of the sub array with n elements in an array or integers.

You can find such sum by running a binary search on 2^n numbers: first you find 2^(n-1) th Minimum Sum of the array,and compare it with n, and repeat it with binary search to find n.

I think this is an np problem.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.