Bifunctor Theorem and strictification tensor product for double categories with lax double functors

Abstract

We introduce a candidate for the inner hom for Dblstlx, the category of strict double categories and lax double functors, and characterize a lax double functor into it obtaining a lax double quasi-functor. The latter consists of a pair of lax double functors with four 2-cells resembling distributive laws. We extend this characterization to a 2-category isomorphism qhop(×,) hop(, ,). We show that instead of a Gray monoidal product in Dblstlx we obtain a product that in a sense strictifies lax double quasi-functors. We prove a bifunctor theorem by which certain type of lax double quasi-functors give rise to lax double functors on the Cartesian product, extend it to a 2-functor qhopns(×,)hop(×,) and show how it restricts to a biequivalence. The (un)currying 2-functors are studied. We prove that a lax double functor from the trivial double category is a monad in the codomain double category, and show that our above 2-functor in the form qhop(*× *,)hop(*,) recovers the specification (()):(())(()) of the natural transformation introduced by Street, where () is the horizontal 2-category of .

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