VC-dimension and the jump to the fastest speed of a hereditary L-property

Abstract

In this paper we investigate a connection between the growth rates of certain classes of finite structures and a generalization of VC-dimension called VC-dimension. Let L be a finite relational language with maximum arity r. A hereditary L-property is a class of finite L-structures closed under isomorphism and substructures. The speed of a hereditary L-property H is the function which sends n to |Hn|, where Hn is the set of elements of H with universe \1,…, n\. It was previously known there exists a gap between the fastest possible speed of a hereditary L-property and all lower speeds, namely between the speeds 2(nr) and 2o(nr). We strengthen this gap by showing that for any hereditary L-property H, either |Hn|=2(nr) or there is ε>0 such that for all large enough n, |Hn|≤ 2nr-ε. This improves what was previously known about this gap when r≥ 3. Further, we show this gap can be characterized in terms of VC-dimension, therefore drawing a connection between this finite counting problem and the model theoretic dividing line known as -dependence.