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The question is to set up a recurrence relation to find the value given by the algorithm. The answer should be in teta() terms.

foo = 0;

for int i=1 to n do
    for j=ceiling(sqrt(i)) to n do
        for k=1 to ceiling(log(i+j)) do
             foo++
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Can you reformat this? –  Andrew Sledge Oct 20 '10 at 13:37
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Is this homework? If so, tag it as such. –  apandit Oct 20 '10 at 13:41
    
tagged homework, what do you mean by reformat. I'm new to this platform. Is there sth I need to use to format? –  conapart Oct 20 '10 at 13:49
    
So, now, what's the specific question? You'd like us to post the final solution? -- What does this foo stand for? –  Flinsch Oct 20 '10 at 13:58
    
I modified it foo is the variable to increment at every step. I would like to have a recurrence relation "f(n) = blah blah" which is the final value of the foo after all iterations –  conapart Oct 20 '10 at 14:04

1 Answer 1

Not entirely sure but here goes.

Second loop executes 1 - sqrt(1) + 2 - sqrt(2) + ... + n - sqrt(n) = n(n+1)/2 - n^1.5 times => O(n^2) times. See here for a discussion that sqrt(1) + ... + sqrt(n) = O(n^1.5).

We've established that the third loop will get fired O(n^2) times. So the algorithm is asymptotically equivalent to something like this:

for i = 1 to n do
    for j = 1 to n do
        for k = 1 to log(i+j) do
            ++foo

This leads to the sum log(1+1) + log(1+2) + ... + log(1+n) + ... + log(n+n). log(1+1) + log(1+2) + ... + log(1+n) = log(2*3*...*(n+1)) = O(n log n). This gets multiplied by n, resulting in O(n^2 log n).

So your algorithm is also O(n^2 log n), and also Theta(n^2 log n) if I'm not mistaken.

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+1: Theta(n^2 log n) looks right and for not handing over the recurrence relation... –  Aryabhatta Oct 20 '10 at 16:52

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