Approximating Red-Blue Set Cover and Minimum Monotone Satisfying Assignment

Abstract

We provide new approximation algorithms for the Red-Blue Set Cover and Circuit Minimum Monotone Satisfying Assignment (MMSA) problems. Our algorithm for Red-Blue Set Cover achieves O(m1/3)-approximation improving on the O(m1/2)-approximation due to Elkin and Peleg (where m is the number of sets). Our approximation algorithm for MMSAt (for circuits of depth t) gives an O(N1-δ) approximation for δ = 1323- t/2, where N is the number of gates and variables. No non-trivial approximation algorithms for MMSAt with t≥ 4 were previously known. We complement these results with lower bounds for these problems: For Red-Blue Set Cover, we provide a nearly approximation preserving reduction from Min k-Union that gives an (m1/4 - ) hardness under the Dense-vs-Random conjecture, while for MMSA we sketch a proof that an SDP relaxation strengthened by Sherali--Adams has an integrality gap of N1- where 0 as the circuit depth t ∞.