Dp-minimal expansions of (Z,+) via dense pairs via Mordell-Lang

Abstract

This is a contribution to the classification problem for dp-minimal expansions of (Z,+). Let S be a dense cyclic group order on (Z,+). We use results on "dense pairs" to construct uncountably many dp-minimal expansions of (Z,+,S). These constructions are applications of the Mordell-Lang conjecture and are the first examples of "non-modular" dp-minimal expansions of (Z,+). We canonically associate an o-minimal expansion R of (R,+,×), an R-definable circle group H, and a character Z H to a "non-modular" dp-minimal expansion of (Z,+,S). We also construct a "non-modular" dp-minimal expansion of (Z,+,Valp) from the character Z Z×p, k exp(pk).