Stable groups and expansions of (Z,+,0)

Abstract

We show that if G is a sufficiently saturated stable group of finite weight with no infinite, infinite-index, chains of definable subgroups, then G is superstable of finite U-rank. Combined with recent work of Palacin and Sklinos, we conclude that (Z,+,0) has no proper stable expansions of finite weight. A corollary of this result is that if P⊂eqZn is definable in a finite dp-rank expansion of (Z,+,0), and (Z,+,0,P) is stable, then P is definable in (Z,+,0). In particular, this answers a question of Marker on stable expansions of the group of integers by sets definable in Presburger arithmetic.