Span, Cospan, and Other Double Categories

Abstract

Given a double category D such that D0 has pushouts, we characterize oplax/lax adjunctions between D and Cospan(D0) such that the right adjoint is normal and restricts to the identity on D0, where Cospan(D0) denotes the double category on D0 whose vertical morphisms are cospans. We show that such a pair exists if and only if D has companions, conjoints, and 1-cotabulators. The right adjoints are induced by the companions and conjoints, and the left adjoints by the 1-cotabulators. The notion of a 1-cotabulator is a common generalization of the symmetric algebra of a module and Artin-Wraith glueing of toposes, locales, and topological spaces. Along the way, we obtain a characterization of double categories with companions and conjoints as those for which the identity functor on D0 extends to a normal lax functor from Cospan(D0) to D.