Constant Approximating Parameterized k-SetCover is W[2]-hard

Abstract

In this paper, we prove that it is W[2]-hard to approximate k-SetCover within any constant ratio. Our proof is built upon the recently developed threshold graph composition technique. We propose a strong notion of threshold graphs and use a new composition method to prove this result. Our technique could also be applied to rule out polynomial time o( n n) ratio approximation algorithms for the non-parameterized k-SetCover problem with k as small as O( n n)3, assuming W[1]≠FPT. We highlight that our proof does not depend on the well-known PCP theorem, and only involves simple combinatorial objects.