Higher genus Kashiwara-Vergne problems and the Goldman-Turaev Lie bialgebra

Abstract

We define a family KV(g,n) of Kashiwara-Vergne problems associated with compact connected oriented 2-manifolds of genus g with n+1 boundary components. The problem KV(0,3) is the classical Kashiwara-Vergne problem from Lie theory. We show the existence of solutions of KV(g,n) for arbitrary g and n. The key point is the solution of KV(1,1) based on the results by B. Enriquez on elliptic associators. Our construction is motivated by applications to the formality problem for the Goldman-Turaev Lie bialgebra g(g, n+1). In more detail, we show that every solution of KV(g,n) induces a Lie bialgebra isomorphism between g(g, n+1) and its associated graded gr \, g(g, n+1). For g=0, a similar result was obtained by G. Massuyeau using the Kontsevich integral. This paper is a summary of our results. Details and proofs will appear elsewhere.