Definable types in algebraically closed valued fields

Abstract

Marker and Steinhorn shown that given two models M N of an o-minimal theory, if all 1-types over M realized in N are definable, then all types over M realized in N are definable. In this article we characterize pairs of algebraically closed valued fields satisfying the same property. Although it is true that if M is an algebraically closed valued field such that all 1-types over M are definable then all types over M definable, we build a counterexample for the relative statement, i.e., we show for any n≥ 1 that there is a pair M N of algebraically closed valued fields such that all n-types over M realized in N are definable but there is an n+1-type over M realized in N which is not definable. Finally, we discuss what happens in the more general context of C-minimality.