Mapping class group actions on configuration spaces and the Johnson filtration

Abstract

Let Fn(g,1) denote the configuration space of n ordered points on the surface g,1 and let g,1 denote the mapping class group of g,1. We prove that the action of g,1 on Hi(Fn(g,1);Z) is trivial when restricted to the ith stage of the Johnson filtration J(i)⊂ g,1. We give examples showing that J(2) acts nontrivially on H3(F3(g,1)) for g 2, and provide two new conceptual reinterpretations of a certain group introduced by Moriyama.