Bi-initial objects and bi-representations are not so different

Abstract

We introduce a functor V DblCath,nps 2Cath,nps extracting from a double category a 2-category whose objects and morphisms are the vertical morphisms and squares. We give a characterisation of bi-representations of a normal pseudo-functor F Cop Cat in terms of double bi-initial objects in the double category El(F) of elements of F, or equivalently as bi-initial objects of a special form in the 2-category VEl(F) of morphisms of F. Although not true in general, in the special case where the 2-category C has tensors by the category 2=\0 1\ and F preserves those tensors, we show that a bi-representation of F is then precisely a bi-initial object in the 2-category El(F) of elements of F. We give applications of this theory to bi-adjunctions and weighted bi-limits.