Definability of derivations in the reducts of differentially closed fields

Abstract

Let F=(F;+,·,0,1,D) be a differentially closed field. We consider the question of definability of the derivation D in reducts of F of the form FR=(F;+,·,0,1,P)P ∈ R where R is a collection of definable sets in F. We give examples and non-examples and establish some criteria for definability of D. Finally, using the tools developed in the paper we prove that under the assumption of inductiveness of Th(FR) model completeness is a necessary condition for definability of D. This can be seen as part of a broader project where one is interested in finding Ax-Schanuel type inequalities (or predimension inequalities) for differential equations.