Real simple modules over simply-laced quantum affine algebras and categorifications of cluster algebras

Abstract

Let C be the category of finite-dimensional modules over a simply-laced quantum affine algebra Uq(g). For any height function and ∈ Z≥ 1, we introduce certain subcategories C≤ of C, and prove that the quantum Grothendieck ring Kt(C≤ ) of C≤ admits a quantum cluster algebra structure. Using F-polynomials and monoidal categorifications of cluster algebras, we classify all real simple modules in C≤ 1 in terms of their highest -weight monomials, among them the families of type D and type E are new. For any , inspired by Hernandez and Leclerc's work, we propose two conjectures for the study of real simple modules, and prove them for the subcategories C≤ whose Grothendieck rings are cluster algebras of finite type.