Completion for braided enriched monoidal categories

Abstract

Monoidal categories enriched in a braided monoidal category V are classified by braided oplax monoidal functors from V to the Drinfeld centers of ordinary monoidal categories. In this article, we prove that this classifying functor is strongly monoidal if and only if the original V-monoidal category is tensored over V. We then define a completion operation which produces a tensored V-monoidal category C from an arbitrary V-monoidal category C, and we determine many equivalent conditions which imply C and C are V-monoidally equivalent. Since being tensored is a property of the underlying V-category of a V-monoidal category, we begin by studying the equivalence between (tensored) V-categories and oplax (strong) V-module categories respectively. We then define the completion operation for V-categories, and adapt these results to the V-monoidal setting.