Star sorts, Lelek fans, and the reconstruction of non-\0-categorical theories in continuous logic

Abstract

We prove a reconstruction theorem valid for arbitrary theories in continuous (or classical) logic in a countable language, that is to say that we provide a complete bi-interpretation invariant for such theories, taking the form of an open Polish topological groupoid. More explicitly, for every such theory T we construct a groupoid G*(T) that only depends on the bi-interpretation class of T, and conversely, we reconstruct from G*(T) a theory that is bi-interpretable with T. The basis of G*(T) (namely, the set of objects, when viewed as a category) is always homeomorphic to the Lelek fan. We break the construction of the invariant into two steps. In the second step we construct a groupoid from any reconstruction sort, while in the first step such a sort is constructed. This allows us to place our result in a common framework with previously established ones, which only differ by their different choice of a reconstruction sort.