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I just started a course on Asymptotic Analysis and in one of our assignments I am supposed to add functionality to a function without changing the complexity. The complexity is log(N). The homework guideline asks me specifically to change the runtime by a 'constant'. Would making it 3Log(N) be considered changing it by a constant?

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Did you forget the exact definition of O(log N) ? Go back to the definition to understand that the answer is trivially yes –  Basile Starynkevitch Apr 27 '12 at 5:07
Can you show how did you end up getting 3log(n)? –  noMAD Apr 27 '12 at 5:08
I believe that adding something, like (constant + log(N)) would be considered adding a constant factor, whereas 3LogN would be multiplying. Although I know by definition that O(3LogN) = o(LogN), I feel my instructor meant the additive form. The thing is I did not want to take any chances with my assignment so I wanted to clarify with more knowledgeable folks. –  devjeetroy Apr 27 '12 at 5:16
I think you need to look up what "factor" means. –  Carl Norum Apr 27 '12 at 5:21

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Yes, more specifically, this would be changing it by a multiplicative constant. You could also change it by an additive constant like log(N)+5.

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Yes, this thing is changing an algorithm by a multiple of something like 3 is highly unlikely unless you do something like run a nested loop just 3 times which again might not be the optimal solution. –  noMAD Apr 27 '12 at 5:10
The original function involved adding an element to a binary search tree. To complete my assignment, I had to modify the code so as to traverse the tree not once, but twice. Would that be 2LogN? –  devjeetroy Apr 27 '12 at 5:18
@noMAD It's not uncommon to need to do something in a constant number passes over a data structure, or to add a constant number of operations inside the iteration. –  trutheality Apr 27 '12 at 5:20
@ZachSchnider Yes. What noMAD is alluding to is probably the fact that O(2 log n) is still = O(log n). –  trutheality Apr 27 '12 at 5:21
@nikhil That's right: O( log(n^2) ) = O(2 log n) = O(log n). But don't confuse log(n^2) with (log n)^2, because those don't have the same asymptotic complexity. –  trutheality Jan 28 '13 at 17:01

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