The higher connectivity at infinity of mapping class groups

Abstract

The higher connectivity at infinity for mapping class groups of surfaces with boundary components and punctures is understood with the exceptions of the mapping class groups for the closed surfaces of genus 3 and 4. In this paper we prove a general simply connected at infinity result for finitely presented groups that implies all mapping class groups of closed surfaces of genus ≥ 3 are simply connected at infinity. As these groups are duality groups the Proper Hurewicz Theorem implies that they are (n-2)-connected at infinity where n is the dimension of the group. Combining this result with earlier work we give a complete list of all mapping class groups and their connectivity at infinity.