I am faced with a problem where I have to calculate intersections between all pairs in a collection of sets. None of the sets are smaller than a small constant *k*, and I'm only interested in whether two sets have an intersection larger than *k*-1 elements or not. I do not need the actual intersections nor the exact size, *only* whether it's larger than *k*-1 or not. Is there some clever pre-processing trick or a neat set intersection algorithm that I could use to speed things up?

More info that can be useful to answer the question:

- The sets represent maximal cliques in a large, undirected, sparse graph. The number of sets can be in the order of tens of thousands or more, but most of the sets are likely to be small.
- The
~~sets are already sorted~~members of each set are in increasing order. Effectively they are sorted lists - I receive them this way from an underlying library for maximal clique search. - Nothing is known about the distribution of elements in the sets (i.e. whether they are in tight clumps or not).
- Most of the set intersections are likely to be empty, so the ideal solution would be a clever data structure that helps me cut down the number of set intersections I have to make.

kvertices. – Tamás Apr 27 '11 at 12:03@Steve Jessop, you could post your comment as an answer - it's good if the sets are small. Other thing I could think of is a`Set`

implementation based on an ordered array. It can have a`hasKCommon(Set other, int k)`

method that iterates the elements and leaves off early, if the result is clear before end of iteration. – Victor Sergienko Apr 29 '11 at 10:08