Double Johnson filtrations for mapping class groups

Abstract

We first develop a general theory of Johnson filtrations and Johnson homomorphisms for a group G acting on another group K equipped with a filtration indexed by a "good" ordered commutative monoid. Then, specializing it to the case where the monoid is the additive monoid N2 of pairs on nonnegative integers, we obtain a theory of double Johnson filtrations and homomorphisms. We apply this theory to the mapping class group M of a surface g,1 with one boundary component, equipped with the normal subgroups X, Y of π1(g,1) associated to a standard Heegaard splitting of the 3-sphere. We also consider the case where the group G is the automorphism group of a free group.