2-roots for simply laced Weyl groups

Abstract

We introduce and study "2-roots", which are symmetrized tensor products of orthogonal roots of Kac--Moody algebras. We concentrate on the case where W is the Weyl group of a simply laced Y-shaped Dynkin diagram Ya,b,c having n vertices and with three branches of arbitrary finite lengths a, b and c; special cases of this include types Dn, En (for arbitrary n ≥ 6), and affine E6, E7 and E8. We show that a natural codimension-1 submodule M of the symmetric square of the reflection representation of W has a remarkable canonical basis B that consists of 2-roots. We prove that, with respect to B, every element of W is represented by a column sign-coherent matrix in the sense of cluster algebras. If W is a finite simply laced Weyl group, each W-orbit of 2-roots has a highest element, analogous to the highest root, and we calculate these elements explicitly. We prove that if W is not of affine type, the module M is completely reducible in characteristic zero and each of its nontrivial direct summands is spanned by a W-orbit of 2-roots.