Short monadic second order sentences about sparse random graphs
Abstract
In this paper, we study zero-one laws for the Erd\H{o}s--R\'{e}nyi random graph model in the case when for . For a given class of logical sentences about graphs and a given function , we say that obeys the zero-one law (w.r.t. the class ) if each sentence either a.a.s. true or a.a.s. false for . In this paper, we consider first order properties and monadic second order properties of bounded \textit{quantifier depth} , that is, the length of the longest chain of nested quantifiers in the formula expressing the property. Zero-one laws for properties of quantifier depth we call the \textit{zero-one -laws}. The main results of this paper concern the zero-one -laws for monadic second order properties (MSO properties). We determine all values , for which the zero-one -law for MSO properties does not hold. We also show that, in contrast to the case of the -law, there are infinitely many values of for which the zero-one -law for MSO properties does not hold. To this end, we analyze the evolution of certain properties of that may be of independent interest.
Cite
@article{arxiv.1611.07260,
title = {Short monadic second order sentences about sparse random graphs},
author = {Andrey Kupavskii and Maksim Zhukovskii},
journal= {arXiv preprint arXiv:1611.07260},
year = {2018}
}