worst case running time calculation

It's from homework, but I'm asking for a general method.

Calculate the following code's worst case running time.

``````int sum = 0;
for (int i = 0; i*i < N; i++)
for (int j = 0; j < i*i; j++)
sum++;
``````

the answer is N^3/2, could anyone help me through this?

Is there a general way to calculate this?

``````This is what I thought:

when i = 0, sum++ will be called 0 time
when i = 1, sum++ will be called 1 time
when i = 2, sum++ will be called 4 times
...
when i = i, sum++ will be called i^2 times

so the worst time will be
0 + 1 + 4 + 9 + 16 + ... + i^2
``````

but what next?? I'm lost here...

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3 Answers

You want to count how many times the innermost cycle will run.

The outer one will run from i = 0, to i = sqrt(N) (since i*i < N). For each iteration of the outer one the inner one will run i^2 times.

Thus the total number of times the inner one will run is:

``````1^2 + 2^2 + 3^2 + ... + sqrt(N)^2
``````

There is a formula:

``````1^2 + 2^2 + ... + k^2 = k(k+1)(2k+1) / 6 = O(k^3).
``````

In your case k = sqrt(N).

This the total complexity is `O(sqrt(N)^3) = O(N^(3/2))`.

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So Aaron Digulla's answer is wrong? –  shengy Aug 14 '12 at 8:31
his answer is a heuristic, that might work, in most cases, but is a wrong argument - the inner loop doesn't run N^2 times of course. And you can't just multiply the inner and the outer loops as if they were independent –  Petar Ivanov Aug 14 '12 at 8:33
So can I conclude that if the outer loop and the inner loop is independent, I can simply multiply their run times, such as O(m*n), but if they are not independent, I can only analysis it by hand and figure something like `when i=0, inner loop will run x times` and then add them together and find a sum formula? –  shengy Aug 14 '12 at 8:37
yeah exactly - when they are independent you can of course multiply. It's all a matter of how many times the inner loop runs - that's all it matters –  Petar Ivanov Aug 14 '12 at 8:38
Or can I substitute vars in the inner loop like kpentchev did in his answer? –  shengy Aug 14 '12 at 8:39
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then just calculate this sum

(i^2)/2 * N^(1/2) = N/2 * N^(1/2) = N^(3/2)

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You are approaching this problem in the wrong way. To count the worst time, you need to find the maximum number of operations that will be performed. Because you have only a single operation in a double loop, it is enough to find out how many times the inner loop will execute.

You can do this by examining the limits of your loops. For the outer loop it is:

``````i^2 < N => i < sqrt(N)
``````

The limit for your inner loop is

``````j < i^2
``````

You can substitute in the second equasion to get `j < N`.

Because these are nested loops you multiply their limits to get the final result:

``````sqrt(N)*N = N^3/2
``````
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So by substituting i with sqrt(N), you actually didn't prove the complexity to be O(N^(3/2)). You only prove that the complexity is <= O(N^(3/2)). Because what you are doing is you are bounding it from above. –  Petar Ivanov Aug 14 '12 at 8:40
I stand corrected. What I did is only valid for independent nested loops, which these are not. Your formula is correct. –  kpentchev Aug 14 '12 at 9:49
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