You are given two sets of integers, sizes M and N with M < N. Perform inner equal join on these two sets (i.e., find intersection of the two lists). How to perform it if both the lists are in files and the available memory is of size K < M < N
Using an inplace sorting algorithm to sort both the lists first. Once both M an N are sorted, then calculating the intersection is like a race. Place two markers
Given a decent inplace sorting algorithm, the complexity of this will be 








take K/2 elements of M and K/2 elements of N. Sort Msubset and Nsubset. Now the intersection is trivial. Write the intersection, drop elements of the intersection, write back the left elements. Continue with all other K/2 subparts of M and N. You have now some common elements in a third file, and some partially sorted lists. Now for each K / 2 (minus removed elements) of M and N lists, compare them to find intersection efficiently. (You also can add extra rounds of merging of 2 Msubsets and Nsubsets to speed up intersection). Hurrah ! Example of execution:



I think you can use bit set for this purpose.BitSet only consumes one bit per integer. Hope this helps.



A nested loop join will take minimal memory. For each row in file 1 you load each row in file 2 and compare it. Then I guess you mark the hits in file 1. Depending on the sizes of the files it might be more efficient to sort one of the files first (which can be done with minimal memory). A lot depends on the amount of memory you have to play with. 


INT_MAX/8
? – Steve Jessop Jul 24 '10 at 21:37