On the Lov\'asz Theta function for Independent Sets in Sparse Graphs

Abstract

We consider the maximum independent set problem on graphs with maximum degree~d. We show that the integrality gap of the Lov\'asz -function based SDP is O(d/3/2 d). This improves on the previous best result of O(d/ d), and almost matches the integrality gap of O(d/2 d) recently shown for stronger SDPs, namely those obtained using poly-((d)) levels of the SA+ semidefinite hierarchy. The improvement comes from an improved Ramsey-theoretic bound on the independence number of Kr-free graphs for large values of r. We also show how to obtain an algorithmic version of the above-mentioned SA+-based integrality gap result, via a coloring algorithm of Johansson. The resulting approximation guarantee of O(d/2 d) matches the best unique-games-based hardness result up to lower-order poly-( d) factors.