Loop space homology of a small category

Abstract

In a 2009 paper, Dave Benson gave a description in purely algebraic terms of the mod p homology of (BGp), when G is a finite group, BGp is the p-completion of its classifying space, and (BGp) is the loop space of BGp. The main purpose of this work is to shed new light on Benson's result by extending it to a more general setting. As a special case, we show that if C is a small category, |C| is the geometric realization of its nerve, R is a commutative ring, and |C|+R is a "plus construction" for |C| in the sense of Quillen (taken with respect to R-homology), then H*((|C|+R);R) can be described as the homology of a chain complex of projective RC-modules satisfying a certain list of algebraic conditions that determine it uniquely up to chain homotopy. Benson's theorem is now the case where C is the category of a finite group G, R=Fp for some prime p, and |C|+R=BGp.