Approximations of the Densest k-Subhypergraph and Set Union Knapsack problems

Abstract

For any given ε>0 we provide an algorithm for the Densest k-Subhypergraph Problem with an approximation ratio of at most O(nθm+2ε) for θm=12m-12-12m and run time at most O(nm-2+1/ε), where the hyperedges have at most m vertices. We use this result to give an algorithm for the Set Union Knapsack Problem with an approximation ratio of at most O(nαm+ε) for αm=23[m-1-2m-2m2+m-1] and run time at most O(n5(m-2)+9/ε), where the subsets have at most m elements. The author is not aware of any previous results on the approximation of either of these two problems.