Homotopical presentations of braid groups via reduced lifts

Abstract

In 1997, Deligne showed that the reduced lift presentation of a finite type generalized braid group remains correct if it is (suitably) interpreted as a presentation of a topological monoid. In this expository paper, we point out that Deligne's argument does not require the 'finite type' hypothesis, so it gives a different proof of a theorem proved by Dobrinskaya in 2006. We also review how to use this result to construct an action of the braid group on the finite or affine Hecke ∞-category via intertwining functors.