Automata and tame expansions of (Z,+)

Abstract

The problem of characterizing which automatic sets of integers are stable is here solved. Given a positive integer d and a subset A⊂eq Z whose set of representations base d is recognized by a finite automaton, a necessary condition is found for x+y∈ A to be a stable formula in Th(Z,+,A). Combined with a theorem of Moosa and Scanlon this gives a combinatorial characterization of the d-automatic A⊂eq Z such that (Z,+,A) is stable. This characterization is in terms of what were called "F-sets" by Moosa and Scanlon and "elementary p-nested sets" by Derksen. Automata-theoretic methods are also used to produce some NIP expansions of (Z,+), in particular the expansion by the monoid (dN,× ).