Distal Expansions of the Integers and the p-adic Fields
Abstract
This paper investigates expansions of distal structures by a unary subset that arises as the image of a projection map. We first provide a sufficient condition for such an expansion to remain distal. Based on this criterion, we establish the distality of three kinds of expansions involving the integers or the p-adic fields. Let R be an almost sparse sequence. We prove that (Z;<,+,R) is distal, thereby answering a question posed by Tong. Furthermore, we show the distality of (Qp;+,·,pZ) and (Qp;+,·,pZ,pR).The latter provides an example of a NIP expansion of the p-adic field without the rationality of the Poincar\'e series.
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