A new dp-minimal expansion of the integers

Abstract

We consider the structure (Z,+,0,|p1,…,|pn), where x|py means vp(x)≤ vp(y) and vp is the p-adic valuation. We prove that its theory has quantifier elimination in the language \+,-,0,1,(Dm)m≥1,|p1,…,|pn\ where Dm(x) ∃ y ~ my = x, and that it has dp-rank n. In addition, we prove that a first order structure with universe Z which is an expansion of (Z,+,0) and a reduct of (Z,+,0,|p) must be interdefinable with one of them. We also give an alternative proof for Conant's analogous result about (Z,+,0,<).