Colimits of categories, zig-zags and necklaces

Abstract

Given a diagram of small categories F : J → Cat, we provide a combinatorial description of its colimit in terms of the indexing category J and the categories and functors in the diagram F. We introduce certain double categories of zig-zags in order to keep track of the necessary identifications. We found these double categories necessary, but also explanatory. When applied pointwise in the simplicially enriched setting, our constructions offer a shorter proof of the necklace theorem of Dugger and Spivak by direct computation.