Topologically 1-based T-minimal Structures

Abstract

We prove group existence and structure theorems in a general setting of tame topological theories. More precisely, we identify a linear/non-linear dividing line -- called topological 1-basedness -- among the class of t-minimal theories with the independent neighborhood property. This is a wide class including all visceral theories, as well as all dense weakly o-minimal and C-minimal theories (even those where exchange fails). Now assume M is highly saturated and t-minimal with the independent neighborhood property. We show that if M is non-trivial and topologically 1-based, it admits a type-definable abelian group (G,+) with G an open subset of M. Moreover, we can ensure that G is a topological group with the subspace topology inherited from M; and in this case, we show that the induced structure on G satisfies an appropriate topological analog of the Hrushovski-Pillay classification of 1-based stable groups.