Braid group action on the module category of quantum affine algebras

Abstract

Let g0 be a simple Lie algebra of type ADE and let U'q(g) be the corresponding untwisted quantum affine algebra. We show that there exists an action of the braid group B(g0) on the quantum Grothendieck ring Kt(g) of Hernandez-Leclerc's category Cg0. Focused on the case of type AN-1, we construct a family of monoidal autofunctors \Si\i∈ Z on a localization TN of the category of finite-dimensional graded modules over the quiver Hecke algebra of type A∞. Under an isomorphism between the Grothendieck ring K(TN) of TN and the quantum Grothendieck ring Kt(A(1)N-1), the functors \Si\1 i N-1 recover the action of the braid group B(AN-1). We investigate further properties of these functors.