Vertex-minor Ramsey numbers: exact values and extremal structure

Abstract

We determine the vertex-minor Ramsey number (4)=11, where (k) is the smallest~n such that every n-vertex graph contains the edgeless graph~Ek as a vertex-minor. We prove this by an exhaustive classification of the graphs on~10 and~11 vertices under local complementation. At the extremal order n=10, exactly six non-isomorphic graphs avoid~E4 as a vertex-minor; up to isomorphism, they represent five LC-equivalence classes, and each labeled LC orbit has cardinality~8,712. Thus k=4 is the first case in which the general upper bound 2k-1 is not attained. Using the extremal graphs as building blocks, we derive explicit lower bounds on~(k) that surpass the leading term of the asymptotic bound for all k≤ 9; in particular, (5)≥ 13. We also describe structural properties of the six extremal graphs and formulate the next open problem, whether (5)=15.