On definable groups in dp-minimal topological fields equipped with a generic derivation

Abstract

Let T be a complete, model-complete, geometric dp-minimal L-theory of topological fields of characteristic 0 and let T(∂) be the theory of expansions of models of T by a derivation ∂. We assume that T(∂) has a model-companion T∂. Let be a finite-dimensional L∂-definable group in a model of T∂. Then we show that densely and definably embeds in an L-definable group G. Further, using a C1-cell decomposition result, we show that densely and definably embeds in a definable D-group, generalizing the classical construction of Buium of algebraic D-groups and extending for that class of fields, results obtained in arXiv:2208.08293, arXiv:2305.16747.