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I just bumped on to this question today and was trying for a solution that is better than O(N) but could not come up with one.

Searched through SO but couldn't find this question.

Is there any solution better than O(n) or is it a problem that cannot be solved better than that?

My initial thought was Binary Search but again for that you need to sort it which is again >n. I also thought of applying quicksort for just the half of the array to which the search element might belong but again we are making n comparisons initially and discarding the other half only later. Am I getting this right or am I looking at the solution in a wrong direction?

I was trying for a solution in c++ and no javascript's IndexOf() or C# Array.find() or LINQ's.

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I don't think you can do better than O(n) if it isn't sorted. –  Mysticial Oct 5 '11 at 4:46

4 Answers 4

up vote 1 down vote accepted

Make it parallel. Divide the array in chunks and search in parallel. The complexity will be O(n) but running time will be much less. Actually it will be proportional to no. of processors you have.

You can use Parallel Patterns Library in C++

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I bet it will become memory bound before you get any significant speedup. –  Mysticial Oct 5 '11 at 4:52
@Mysticial in that case you can distribute the search over a cluster and divide the file in chunks if its large enough. –  Hasan Khan Oct 5 '11 at 4:55
Yes I also thought about breaking the array and trying threads with them but thats not an algorithmic perspective of this problem. Thats again implementation specific like IndexOf() or find() –  Ajai Oct 5 '11 at 4:56
@Ajai not exactly. If you can pool processors equal to Log(n) then this is going to be Log(n). Think about cloud computing. –  Hasan Khan Oct 5 '11 at 5:07

You're right, the fastest way is to simply iterate through the array and look for it. Without further information, there is nothing better you can do.

Unless you have a quantum computer, that is.

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I would hope that you wouldn't be programming that quantum computer in C++ –  Foo Bah Oct 5 '11 at 4:49
If you're gonna count parallelism, then yes, you can do better than O(n) time. :) –  Mysticial Oct 5 '11 at 4:50
@Mysticial unless you have a number of processors comparable to n (that is, a countably infinite number of processors), it's not going to change the asymptotic time. –  bdares Oct 5 '11 at 4:53

If it's not sorted, you have to inspect each element.

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If you're searching for one element once, just iterate through it. No possible way to get it faster.

If you're searching multiple times, it would be worth it to index it (or sort it, if you will) and make the following searches fast (log(n)).

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Yeah... You are right...But finding a way to do it for just once might be amazing and could also be used n times without even using binary searching on indexed numbers. –  Ajai Oct 5 '11 at 5:02
It's impossible. Not impossible as in "It's impossible for you to jump 3 meters in the air", because that could happen with lots of steroids and a bouncy floor, but impossible as in 1 + 1 can't equal 3. –  bdares Oct 5 '11 at 5:05
ha ha...! Agreed. I just posted this problem to find whether I was the only person to get struck with this or are there more ? :P –  Ajai Oct 5 '11 at 5:07

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