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Definable types in algebraically closed valued fields

Marker and Steinhorn shown that given two models $M\prec N$ 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, \textit{i.e.}, we show for any $n\geq 1$ that there is a pair $M\prec N$ 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.