Doubles for monoidal categories

Abstract

In a recent paper, Daisuke Tambara defined two-sided actions on an endomodule (= endodistributor) of a monoidal V-category A. When A is autonomous (= rigid = compact), he showed that the V-category (that we call Tamb(A)) of so-equipped endomodules (that we call Tambara modules) is equivalent to the monoidal centre Z[A,V] of the convolution monoidal V-category [A,V]. Our paper extends these ideas somewhat. For general A, we construct a promonoidal V-category DA (which we suggest should be called the double of A) with an equivalence [DA,V] Tamb(A). When A is closed, we define strong (respectively, left strong) Tambara modules and show that these constitute a V-category Tambs(A) (respectively, Tambls(A)) which is equivalent to the centre (respectively, lax centre) of [A,V]. We construct localizations Ds A and Dls A of DA such that there are equivalences Tambs(A) [Ds A,V] and Tambls(A) [Dls A,V]. When A is autonomous, every Tambara module is strong; this implies an equivalence Z[A,V] [DA,V].