Definable groups and fields in t-minimal theories

Abstract

Let T be a theory which is t-minimal, meaning that with respect to some definable topology, a unary definable set D ⊂eq M has non-empty interior iff it is infinite. If K is a definable field in T, then K is finite or "large" in the sense of Pop: any smooth algebraic curve C over K with at least one K-rational point has infinitely many K-rational points. We also assign a canonical topology to any abelian definable group G in a t-minimal theory. In the case where the t-minimal theory is "visceral" in the sense of Dolich and Goodrick, meaning that the definable topology is induced by a definable uniformity, we can drop the assumption of abelianity of G, and the resulting topology on G is a definable manifold in the style of Acosta L\'opez and Hasson.