Enriching a predicate and tame expansions of the integers

Abstract: Given a structure M and a stably embedded ∅-definable set Q, we prove tameness preservation results when enriching the induced structure on Q by some further structure Q. In particular, we show that if T = Th(M) and Th(Q) are stable (resp., superstable, ω-stable), then so is the theory T [Q] of the enrichment of M by Q. Assuming stability of T and a further condition on Q related to the behavior of algebraic closure, we also show that simplicity and NSOP 1 pass from Th(Q) to T [Q]. We then prove several applic… Show more