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What is the Big-O time complexity ( O ) of the following recursive code?

public static int abc(int n) {
    if (n <= 2) {
        return n;
    int sum = 0;
    for (int j = 1; j < n; j *= 2) {
        sum += j;
    for (int k = n; k > 1; k /= 2) {
        sum += k;
    return abc(n - 1) + sum;

My answer is O(n log(n)). Is it correct?

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How did you get O(n)? –  recursive Apr 22 '13 at 3:57
Hi there. I made a mistake. My answer is O(nlogn) –  Lawrence Wong Apr 22 '13 at 4:00
How did you get O(n log n)? –  recursive Apr 22 '13 at 4:05
I am not sure if I am correct but. Based on my understanding, each call for a recursive method is O(1). If there are n calls to be made, it will be O(n). Based on the code fragment, n log n calls are made. Therefore it will result in a time complexity of O(nlogn). –  Lawrence Wong Apr 22 '13 at 4:08

1 Answer 1

Where I'm sitting...I think the runtime is O(n log n). Here's why.

  • You are making n calls to the function. The function definitely depends on n for the number of times the following two operations are made:

    • You loop up to 2*log(n) values to increment a sum.

For a worst case, n is extremely large, but the overall runtime doesn't change. A best case would be that n <= 2, such that only one operation is done (the looping would not occur).

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