Approximately counting independent sets of a given size in bounded-degree graphs

Abstract

We determine the computational complexity of approximately counting and sampling independent sets of a given size in bounded-degree graphs. That is, we identify a critical density αc() and provide (i) for α < αc() randomized polynomial-time algorithms for approximately sampling and counting independent sets of given size at most α n in n-vertex graphs of maximum degree ; and (ii) a proof that unless NP=RP, no such algorithms exist for α>αc(). The critical density is the occupancy fraction of the hard core model on the complete graph K+1 at the uniqueness threshold on the infinite -regular tree, giving αc()e1+e1 as ∞. Our methods apply more generally to anti-ferromagnetic 2-spin systems and motivate new questions in extremal combinatorics.