Stable Set Polytopes with Rank |V(G)|/3 for the Lov\'asz--Schrijver SDP Operator

Abstract

We study the lift-and-project rank of the stable set polytope of graphs with respect to the Lov\'asz--Schrijver SDP operator LS+ applied to the fractional stable set polytope. In particular, we show that for every positive integer , the smallest possible graph with LS+-rank contains 3 vertices. This result is sharp and settles a conjecture posed by Lipt\'ak and the second author in 2003, as well as answers a generalization of a problem posed by Knuth in 1994. We also show that for every positive integer there exists a vertex-transitive graph on at most 4+12 vertices with LS+-rank at least .