On the structure of the top homology group of the Johnson kernel

Abstract

The Johnson kernel is the subgroup Kg of the mapping class group Mod(g) of a genus g oriented closed surface g generated by all Dehn twists about separating curves. In this paper we study the structure of the top homology group H2g-3(Kg, Z). For any collection of 2g-3 disjoint separating curves on g one can construct the corresponding abelian cycle in the group H2g-3(Kg, Z); such abelian cycles will be called simplest. In this paper we describe the structure of Z[ Mod(g)/ Kg]-module on the subgroup of H2g-3(Kg, Z) generated by all simplest abelian cycles and find all relations between them.