Logical complexity of induced subgraph isomorphism for certain graph families

Abstract

We prove that, for every ≥ 4, there exists an -vertex graph and a first order sentence having a quantifier depth at most -1 defining the property of having an induced subgraph isomorphic to the given one. We prove that a first order sentence defining the property of containing an induced subgraph on vertices isomorphic to a given disjoint union of isomorphic complete multipartite graphs has a quantifier depth at least . Finally, we prove that, for every graph on ≤ 5 vertices a sentence defining the property of containing an induced subgraph isomorphic to the given one has a quantifier depth at least -1.