The Lie Lie algebra

Abstract

We study the abelianization of Kontsevich's Lie algebra associated with the Lie operad and some related problems. Calculating the abelianization is a long-standing unsolved problem, which is important in at least two different contexts: constructing cohomology classes in Hk(Out(Fr); Q) and related groups as well as studying the higher order Johnson homomorphism of surfaces with boundary. The abelianization carries a grading by "rank," with previous work of Morita and Conant-Kassabov-Vogtmann computing it up to rank 2. This paper presents a partial computation of the rank 3 part of the abelianization, finding lots of irreducible SP-representations with multiplicities given by spaces of modular forms. Existing conjectures in the literature on the twisted homology of SL3( Z) imply that this gives a full account of the rank 3 part of the abelianization in even degrees.