Configuration spaces of clusters as Ed-algebras

Abstract

It is a classical result that configuration spaces of labelled particles in Rd are free Ed-algebras and that their d-fold bar construction is equivalent to the d-fold suspension of the labelling space. In this paper, we study a variation of these spaces, namely configuration spaces of labelled clusters of particles. These configuration spaces are again Ed-algebras, and we give geometric models for their iterated bar construction in two different ways: one establishes a description of these configuration spaces of clusters as cellular E1-algebras, and the other one uses an additional verticality constraint. In the last section, we apply these results in order to calculate the stable homology of certain vertical configuration spaces.