Statistical mechanics of the minimum vertex cover problem in stochastic block models

Abstract

The minimum vertex cover (Min-VC) problem is a well-known NP-hard problem. Earlier studies illustrate that the problem defined over the Erd\"os-R\'enyi random graph with a mean degree c exhibits computational difficulty in searching the Min-VC set above a critical point c = e = 2.718 …. Here, we address how this difficulty is influenced by the mesoscopic structures of graphs. For this, we evaluate the critical condition of difficulty for the stochastic block model. We perform a detailed examination of the specific cases of two equal-size communities characterized by in- and out- degrees, which are denoted by c in and c out, respectively. Our analysis based on the cavity method indicates that the solution search becomes difficult when c in +c out > e, but becomes easy again when cout is sufficiently larger than cin in the region c out>e. Experiments based on various search algorithms support the theoretical prediction.