Hierarchically cocompact classifying spaces for mapping class groups of surfaces

Abstract

We define the notion of a hierarchically cocompact classifying space for a family of subgroups of a group. Our main application is to show that the mapping class group Mod(S) of any connected oriented compact surface S, possibly with punctures and boundary components and with negative Euler characteristic has a hierarchically cocompact model for the family of virtually cyclic subgroups of dimension at most vcd Mod(S)+1. When the surface is closed, we prove that this bound is optimal. In particular, this answers a question of L\"uck for mapping class groups of surfaces.