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So I have been trying to find the time complexity of the code displayed below. I know that the first for loop iterates 'n' times and must be multiplied by the iterations of the second for loop to find the big-oh time complexity. However, the conditions inside the second for loop are confusing me.

public static void main(String[] args) {
    int x = 0;

    for (int i = 0; i < n; i++) {
        for (int j = 0; j < i; j = j * 2) {
            x = x + 1;
        }
    }
}

if j is multiplied by 2 times every iteration, then the time complexity of both loops would be O(nlog(n)). But since j stops based on the value of i, I assume that the summation rule would have to get involved. My best guess to the overall time complexity would be O(nlog^2(n)? Am I right or wrong and why?

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    j=j*2 doesn’t do much starting from 0! Apr 25, 2019 at 3:20

1 Answer 1

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O(log n) is the cost of the last (worst) loop over j, so O(n log n) is an upper bound. The question is whether it’s less because the average cost is lower. But it’s not: that only happens for strongly convex functions (consider a simple inner loop with i iterations, where the average is just a constant factor times n), and log is concave. So it’s just O(n log n) after all.

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  • so you wouldnt need to use the summation rule of n(n+1)/2 where n is log(n)... I assumed you would since 'j' is dependant on 'i'
    – CosmicCat
    Apr 25, 2019 at 5:21
  • @CosmicCat: For linear inner loops, the summation contributes merely a constant factor vs. simple multiplication; for a logarithmic inner loop, it doesn’t even do that. Apr 25, 2019 at 6:29

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