The almost sure theory of finite metric spaces

Abstract

We establish an approximate zero-one law for sentences of continuous logic over finite metric spaces of diameter at most 1. More precisely, we axiomatize a complete metric theory Tas such that, given any sentence σ in the language of pure metric spaces and any ε>0, the probability that the difference of the value of σ in a random metric space of size n and the value of σ in any model of Tas is less than ε approaches 1 as n approaches infinity. We also establish some model-theoretic properties of the theory Tas.