On Rank-Monotone Graph Operations and Minimal Obstruction Graphs for the Lov\'asz--Schrijver SDP Hierarchy

Abstract

We study the lift-and-project rank of the stable set polytopes of graphs with respect to the Lov\'asz--Schrijver SDP operator LS+, with a particular focus on finding and characterizing the smallest graphs with a given LS+-rank (the needed number of iterations of the LS+ operator on the fractional stable set polytope to compute the stable set polytope). We introduce a generalized vertex-stretching operation that appears to be promising in generating LS+-minimal graphs and study its properties. We also provide several new LS+-minimal graphs, most notably the first known instances of 12-vertex graphs with LS+-rank 4, which provides the first advance in this direction since Escalante, Montelar, and Nasini's discovery of a 9-vertex graph with LS+-rank 3 in 2006.