Existential monadic second order logic of undirected graphs: a disproof of the Le Bars conjecture

Abstract

In 2001, J.-M. Le Bars disproved the zero-one law (that says that every sentence from a certain logic is either true asymptotically almost surely (a.a.s.), or false a.a.s.) for existential monadic second order sentences (EMSO) about undirected graphs. He proved that there exists an EMSO sentence φ such that P(Gn φ) does not converge as n∞ (here, the probability distribution is uniform over the set of all graphs on the labeled set of vertices \1, …, n\). In the same paper, he conjectured that, for EMSO sentences with 2 first order variables, the zero-one law holds. In this paper, we disprove this conjecture.