The First Order Definability of Graphs with Separators via the Ehrenfeucht Game

Abstract

We say that a first order formula defines a graph G if is true on G and false on every graph G' non-isomorphic with G. Let D(G) be the minimal quantifier rank of a such formula. We prove that, if G is a tree of bounded degree or a Hamiltonian (equivalently, 2-connected) outerplanar graph, then D(G)=O( n), where n denotes the order of G. This bound is optimal up to a constant factor. If h is a constant, for connected graphs with no minor Kh and degree O( n/ n), we prove the bound D(G)=O( n). This result applies to planar graphs and, more generally, to graphs of bounded genus.

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