Packing-Based Approximation Algorithm for the k-Set Cover Problem

Abstract

We present a packing-based approximation algorithm for the k-Set Cover problem. We introduce a new local search-based k-set packing heuristic, and call it Restricted k-Set Packing. We analyze its tight approximation ratio via a complicated combinatorial argument. Equipped with the Restricted k-Set Packing algorithm, our k-Set Cover algorithm is composed of the k-Set Packing heuristic schrijver for k≥ 7, Restricted k-Set Packing for k=6,5,4 and the semi-local (2,1)-improvement furer for 3-Set Cover. We show that our algorithm obtains a tight approximation ratio of Hk-0.6402+(1k), where Hk is the k-th harmonic number. For small k, our results are 1.8667 for k=6, 1.7333 for k=5 and 1.5208 for k=4. Our algorithm improves the currently best approximation ratio for the k-Set Cover problem of any k≥ 4.