Positive Definability Patterns
Abstract
We reformulate Hrushovski's definability patterns from the setting of first order logic to the setting of positive logic. Given an h-universal theory T we put two structures on the type spaces of models of T in two languages, L and Lπ. It turns out that for sufficiently saturated models, the corresponding h-universal theories T and Tπ are independent of the model. We show that there is a canonical model J of T, and in many interesting cases there is an analogous canonical model Jπ of Tπ, both of which embed into every type space. We discuss the properties of these canonical models, called cores, and give some concrete examples.
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