Curve-excluding fields

Abstract

If C is a curve over Q with genus at least 2 and C(Q) is empty, then the class of fields K of characteristic 0 such that C(K) = has a model companion, which we call CXF. The theory CXF is not complete, but we characterize the completions. Using CXF, we produce examples of fields with interesting combinations of properties. For example, we produce (1) a model-complete field with unbounded Galois group, (2) an infinite field with a decidable first-order theory that is not ``large'' in the sense of Pop, (3) a field that is algebraically bounded but not ``very slim'' in the sense of Junker and Koenigsmann, and (4) a pure field that is strictly NSOP4, i.e., NSOP4 but not NSOP3. Lastly, we give a new construction of fields that are virtually large but not large.