Multiplicative structure in stable expansions of the group of integers

Abstract

We define two families of expansions of (Z,+,0) by unary predicates, and prove that their theories are superstable of U-rank ω. The first family consists of expansions (Z,+,0,A), where A is an infinite subset of a finitely generated multiplicative submonoid of N. Using this result, we also prove stability for the expansion of (Z,+,0) by all unary predicates of the form \qn:n∈N\ for some q∈N≥ 2. The second family consists of sets A⊂eqN which grow asymptotically close to a Q-linearly independent increasing sequence (λn)n=0∞⊂eqR+ such that \λnλm:m≤ n\ is closed and discrete.