The n-Category Café

This is great. Shooting from the hip, the thing that appears most attractive to me is that we now have an alternative global or integrated viewpoint on the string Lie 2-algebra. As I understood things, before this paper the only global/geometric take on the string Lie 2-algebra was that it was the infinitesimal version of the string 2-group (the string 2-group has objects which are smooth paths in the group starting at the unit element).

But strictly speaking, the infinitesimal version of the string 2-group is really the `path Lie 2-algebra’ (which is infinite dimensional). It was then an interesting step to see that this is equivalent (as a Lie 2-algebra) to the finite-dimensional one consisting of a Lie algebra $\mathfrak{g}$ `extended’ by $\mathbb{R}$.

In particular, I didn’t know of a simple direct geometric way to understand that ‘$\mathfrak{g}$’ and the ‘$\mathbb{R}$’ appearing in the classification of Lie 2-algebras.

This paper gives us such a geometric intuition. It says that we can think of that ‘$\mathfrak{g}$’ as really being the left invariant Hamiltonian 1-forms on the group $G$ (in the sense of 2-plectic geometry), and we can think of that ‘$\mathbb{R}$’ as really being the left invariant smooth functions on $G$. Something like that, anyhow. It’s always nicer to have a direct geometric understanding of a particular incarnation of $\mathbb{R}$, rather than just saying ‘$\mathbb{R}$’.

Nice result.

A similar question I once talked about with Danny was if/how one can think of “the universal enveloping algebra of the String Lie 2-algebra” as a quantum group. I was once hoping that one could “explain” quantum groups as universal enveloping algebras of Lie 2-algebras. But I couldn’t see how to.

Chris Rogers is giving a talk on our paper in Göttingen next week. You can see the talk here.