Actions of automorphism groups of free groups on spaces of Jacobi diagrams. II

Abstract

The automorphism group Aut(Fn) of the free group Fn acts on a space Ad(n) of Jacobi diagrams of degree d on n oriented arcs. We study the Aut(Fn)-module structure of Ad(n) by using two actions on the associated graded vector space of Ad(n): an action of the general linear group GL(n,Z) and an action of the graded Lie algebra gr(IA(n)) of the IA-automorphism group IA(n) of Fn associated with its lower central series. We extend the action of gr(IA(n)) to an action of the associated graded Lie algebra of the Andreadakis filtration of the endomorphism monoid of Fn. By using this action, we study the Aut(Fn)-module structure of Ad(n). We obtain an indecomposable decomposition of Ad(n) as Aut(Fn)-modules for n≥ 2d. Moreover, we obtain the radical filtration of Ad(n) for n≥ 2d and the socle of A3(n).