Simply-laced root systems arising from quantum affine algebras

Abstract

Let Uq'(g) be a quantum affine algebra with an indeterminate q and let Cg be the category of finite-dimensional integrable Uq'(g)-modules. We write Cg0 for the monoidal subcategory of Cg introduced by Hernandez-Leclerc. In this paper, we associate a simply-laced finite type root system to each quantum affine algebra Uq'(g) in a natural way, and show that the block decompositions of Cg and Cg0 are parameterized by the lattices associated with the root system. We first define a certain abelian group W (resp. W0) arising from simple modules of Cg (resp. Cg0) by using the invariant ∞ introduced in the previous work by the authors. The groups W and W0 have the subsets and 0 determined by the fundamental representations in Cg and Cg0 respectively. We prove that the pair ( R Z W0, 0) is an irreducible simply-laced root system of finite type and the pair ( R Z W, ) is isomorphic to the direct sum of infinite copies of ( R Z W0, 0) as a root system.