# Complexity of string combination algorithm (as recursive)

I have a method like the following:

How can I calculate the Big-O?

O(2n) or O(nn)??

Thanks.

``````public static void combination(String str, int r)
{

int len = str.length();

if (len == 1) return;

String newStr = null;
for (int i = 0; i < len; i++) {
newStr = str.substring(0, i) + str.substring(i + 1);
combination(newStr, r);
}
}
``````
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Please indent code with four spaces. –  SLaks May 6 '11 at 20:59
Take a look, maybe duplicate: stackoverflow.com/questions/3255/… –  Igor May 6 '11 at 21:01
@Igor: Not really... –  minitech May 6 '11 at 21:02

(since this is homework, just hints!)

Have you worked out what the code does yet? How much output does it produce for a given input?

That must be a lower-bound on the running time of the algorithm since there's no way you can run quicker than the number of outputs you must generate. Perhaps the easiest way would be to look at the size of the list for various inputs and use that as a basis.

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I couldn't find its T(N). –  ProToneRCi May 6 '11 at 21:07

Here's my hint.

``````int n = str.length();
``````
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Try to transform the algorithm into an equation, something like X(n+1) = Function(X(n)) and resolve the equation.

If you can't, try with the initial case X(1) = Function(X(0)), then X(2) = Function(X(1)), etc... You will notice a pattern (and may be the answer is something different than O(2^n) or O(n^n)).

Just hints !!!

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