# Performance of doing bitwise operations on bitsets

In C++ if I do a logical OR (or AND) on two bitsets, for example:

``````bitset<1000000> b1, b2;
//some stuff
b1 |= b2;
``````

Does this happen in O(n) or O(1) time? Why?

Also, can this be accomplished using an array of bools in O(1) time?

Thanks.

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Isn't `|=` bitwise and not logical? –  Pubby Mar 5 '12 at 4:20
This sounds like a homework question. If so, it should be tagged as such. –  Mooing Duck Mar 5 '12 at 6:34

It has to happen in O(N) time since there is a finite number of bits that can be processed in any given chunk of time by a given processor platform. In other words, the larger the bit-set, the longer the amount of time each operation will take, and the increase will be linear with respect to the number of bits in the bitset.

You also end up with the same problem using the array of `bool` types. While each individual operation itself will take O(1) time, the total amount of time for N objects will be O(N).

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The finite amount could be the maximum possible size of a bitset, thus giving O(1). Of course, that will never happen. –  Pubby Mar 5 '12 at 4:24
Right, that would take a theoretical machine with infinite resources, at which point you start play with NP-type problems. –  Jason Mar 5 '12 at 4:29
There's always dreaming of million core processors. –  SinisterRainbow Mar 5 '12 at 4:44
Actually you would need at least a single-processor machine with registers that could each store an infinite amount of memory ... so pretty much impossible. –  Jason Mar 5 '12 at 4:48
@Jason No, infinite memory cannot exist in C++. Rather pointless discussion I suppose as it's irrelevant in practice. –  Pubby Mar 5 '12 at 7:17

It's impossible to perform a logical operation (e.g. OR or AND) on arbitrary arrays of flags in unit time. True Big-Oh analysis deals with runtime as the size of the data tends to infinity, and a Core i7 is never going to OR together a billion bits in the same time it takes to OR together two bit.

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Big O is an asymptotic upper bound. For instance, a quicksort will do `N log(N)` comparisons at minimum. Also, the constant factors don't have to be less than `N` to be constant time. –  Mooing Duck Mar 5 '12 at 6:38