A monoidal category of dependently sorted algebraic theories II: categorical aspects

Abstract

This is the second of a pair of papers where we construct and investigate a closed monoidal structure on the category of generalized algebraic theories (in the sense of Cartmell). Having presented the tensor product of theories in a syntactic way, we now study the same structure from the perspective of contextual categories. We define the exponential A B between two contextual categories A, B, and show how this yields, as a particular case, a cotensor AB by a small category B. We also introduce a concept of multimorphism ( A1, ..., An) → B for contextual categories Ai, B, and describe a bijective correspondence between bimorphisms ( A, B) → C and morphisms A → C B. We give an abstract proof that there exists a contextual category A B such that bimorphisms ( A, B) → C are in natural bijection with morphisms A B → C. We extend :Cont × Cont → Cont into a closed symmetric monoidal structure and give a description of certain pushout-tensor maps that, in particular, allows us to prove that the tensor product of theories from part I is functorial and presents the one constructed here.