Counting Paths and Packings in Halves

Abstract

It is shown that one can count k-edge paths in an n-vertex graph and m-set k-packings on an n-element universe, respectively, in time n k/2 and n mk/2, up to a factor polynomial in n, k, and m; in polynomial space, the bounds hold if multiplied by 3k/2 or 5mk/2, respectively. These are implications of a more general result: given two set families on an n-element universe, one can count the disjoint pairs of sets in the Cartesian product of the two families with (n ) basic operations, where is the number of members in the two families and their subsets.