The relationship between the diagonal and the bar constructions on a bisimplicial set

Abstract

The aim of this paper is to prove that the homotopy type of any bisimplicial set X is modelled by the simplicial set W ¯ X , the bar construction on X. We stress the interest of this result by showing two relevant theorems which now become simple instances of it; namely, the Homotopy colimit theorem of Thomason, for diagrams of small categories, and the generalized Eilenberg–Zilber theorem of Dold–Puppe for bisimplicial Abelian groups. Among other applications, we give an algebraic model for the homotopy theory of (not necessarily path-connected) spaces whose homotopy groups vanish in degree 4 and higher.