I know those commands are for two sets.
Does there any simple and fast way to do this for more then two sets.
I think I can use some kind of loop for this but maybe there are better way.
Thank you
I know those commands are for two sets. Does there any simple and fast way to do this for more then two sets. I think I can use some kind of loop for this but maybe there are better way. Thank you 


For set union, if you are going to see which of M sets has the smallest value that will take M1 comparisons. So now we pop off this value and go again. If N is the total number items in all the sets our algorithm this way is O(NM) (ignore that it's M1 for BigO notation). Where we might be able to optimise is as follows: If we sort the lowest element of each set: Now we pop one off the front, but from that set we just need an O(logM) insertion into our new sorted fronts. We do this for each item so our algorithm is O(N logM). Note that if you have 3 you probably gain nothing. If you have 8 such sets it certainly could show a gain. For setintersection we are looking only for values that appear in all our sets. We know they are all the same if the minimum is the same as the maximum. We can pop off and discard the smaller values if they are not then once again insert each time the one that is next. If so we add to our result then pop from each list. Either way we still will have O(N logM) 


About the set_union: 


If you are using sorted sets (like STL sets) you can do the union/intersection on all of them at once in one pass. If they're plain sets, I don't think you can do better than combining them one at a time. 

