A finitely presented E∞-prop I: algebraic context

Abstract

We introduce a finitely presented prop S = \S(n,m)\ in the category of differential graded modules whose associated operad U(S)=\S(1,m)\ is a model for the E∞-operad. This finite presentation allows us to describe a natural E∞-coalgebra structure on the chains of any simplicial set in terms of only three maps: the Alexander-Whitney diagonal, the augmentation map, and an algebraic version of the join of simplices. The first appendix connects our construction to the Surjection operad of McClure-Smith and Berger-Fresse. The second establishes a duality between the join and AW maps for augmented and non-augmented simplicial sets. A follow up paper constructs a prop corresponding to S in the category of CW-complexes.