Classifying spaces for families of virtually abelian subgroups of surface braid groups

Abstract

Given a group G and an integer n ≥ 0, let Fn denote the family of all virtually abelian subgroups of G of rank at most n. In this article, we show that for each n ≥ 1, the minimal dimension of a model for the classifying space EFnG for the pure braid group of a surface of non-negative Euler characteristic with at least one boundary component or one puncture is equal to the virtual cohomological dimension of G plus n. We prove an analogous result for the full braid group of the sphere. As an application, we compute the minimal dimension of a model for the classifying space associated to the family of amenable subgroups of pure surface braid groups.