PBW theory for quantum affine algebras

Abstract

Let Uq'(g) be a quantum affine algebra of arbitrary type and let Cg be Hernandez-Leclerc's category. We can associate the quantum affine Schur-Weyl duality functor FD to a duality datum D in Cg. We introduce the notion of a strong (complete) duality datum D and prove that, when D is strong, the induced duality functor FD sends simple modules to simple modules and preserves the invariants and ∞ introduced by the authors. We next define the reflections Sk and S-1k acting on strong duality data D. We prove that if D is a strong (resp.\ complete) duality datum, then Sk(D) and Sk-1(D) are also strong (resp.\ complete ) duality data. We finally introduce the notion of affine cuspidal modules in Cg by using the duality functor FD, and develop the cuspidal module theory for quantum affine algebras similarly to the quiver Hecke algebra case.