Generic expansions and the group configuration theorem

Abstract

We exhibit a connection between geometric stability theory and the classification of unstable structures at the level of simplicity and the NSOP1-SOP3 gap. Particularly, we introduce generic expansions TR of a theory T associated with a definable relation R of T, which can consist of adding a new unary predicate or a new equivalence relation. When T is weakly minimal and R is a ternary fiber algebraic relation, we show that TR is a well-defined NSOP4 theory, and use one of the main results of geometric stability theory, the group configuration theorem of Hrushovski, to give an exact correspondence between the geometry of R and the classification-theoretic complexity of TR. Namely, TR is SOP3, and TP2 exactly when R is geometrically equivalent to the graph of a type-definable group operation; otherwise, TR is either simple (in the predicate version of TR) or NSOP1 (in the equivalence relation version.) This gives us new examples of strictly NSOP1 theories.