On linearised and elliptic versions of the Kashiwara-Vergne Lie algebra (1706.08299v1)

Abstract: The goal of this article is to define a linearized or depth-graded version $\mathfrak{lkv}$, and a closely related elliptic version $\mathfrak{krv}{ell}$, of the Kashiwara-Vergne Lie algebra $\mathfrak{krv}$ originally constructed by Alekseev and Torossian as the space of solutions to the linearized Kashiwara-Vergne problem. We show how the elliptic Lie algebra $\mathfrak{krv}{ell}$ is related to earlier constructions of elliptic versions $\mathfrak{grt}{ell}$ and $\mathfrak{ds}{ell}$ of the Grothendieck-Teichm\"uller Lie algebra $\mathfrak{grt}$ and the double shuffle Lie algebra $\mathfrak{ds}$. In particular we show that there is an injective Lie morphism $\mathfrak{ds}{ell}\hookrightarrow \mathfrak{krv}{ell}$, and an injective Lie algebra morphism $\mathfrak{krv}\rightarrow \mathfrak{krv}{ell}$ extending the known morphisms $\mathfrak{grt}\hookrightarrow\mathfrak{grt}{ell}$ (Enriquez section) and $\mathfrak{ds}\rightarrow\mathfrak{ds}_{ell}$ (\'Ecalle map).