A logical limit law for 231-avoiding permutations

Abstract

We prove that the class of 231-avoiding permutations satisfies a logical limit law, i.e. that for any first-order sentence , in the language of two total orders, the probability pn, that a uniform random 231-avoiding permutation of size n satisfies admits a limit as n is large. Moreover, we establish two further results about the behavior and value of pn,: (i) it is either bounded away from 0, or decays exponentially fast; (ii) the set of possible limits is dense in [0,1]. Our tools come mainly from analytic combinatorics and singularity analysis.