Monoidal Adjunctions - Linearity and Duality

Abstract

We explain two related constructions on the data of two monoidal symmetric closed categories A and E and monoidal functors F: E A and G: A E. In a first part, we recall and partly extend work of A. Kock: In case F is left-adjoint to G, and this adjunction is monoidal, we can equip the Eilenberg-Moore category ET for T being the canonical monad associated to the adjunction, with the structure of symmetric monoidal closed category, provided E has equalizers and ET co-equalizers. In a second part, inspired by the Chu-construction, we build a category RG, which is symmetric monoidal closed as well, under the condition that E has pullbacks. Similarly we build a category LF which is symmetric monoidal closed under the condition that A has what we call F-pushouts and F-pullbacks. In case F G is a monoidal adjunction, we show that LF and RG are isomorphic as symmetric monoidal closed categories. We show also how ET is related to both.