Freely adjoining monoidal duals

Abstract

Given a monoidal category C with an object J, we construct a monoidal category C[J] by freely adjoining a right dual J to J. We show that the canonical strong monoidal functor : C C[J] provides the unit for a biadjunction with the forgetful 2-functor from the 2-category of monoidal categories with a distinguished dual pair to the 2-category of monoidal categories with a distinguished object. We show that : C C[J] is fully faithful and provide coend formulas for homs of the form C[J](U, A) and C[J]( A,U) for A∈ C and U∈ C[J]. If N denotes the free strict monoidal category on a single generating object 1 then N[1] is the free monoidal category Dpr containing a dual pair - + of objects. As we have the monoidal pseudopushout C[J] Dpr +N C, it is of interest to have an explicit model of Dpr: we provide both geometric and combinatorial models. We show that the (algebraist's) simplicial category is a monoidal full subcategory of Dpr and explain the relationship with the free 2-category Adj containing an adjunction. We describe a generalization of Dpr which includes, for example, a combinatorial model Dseq for the free monoidal category containing a duality sequence X0 X1 X2 … of objects. Actually, Dpr is a monoidal full subcategory of Dseq.