Equivariant multiplicities via representations of quantum affine algebras

Abstract

For any simply-laced type simple Lie algebra g and any height function adapted to an orientation Q of the Dynkin diagram of g, Hernandez-Leclerc introduced a certain category C≤ of representations of the quantum affine algebra Uq(g), as well as a subcategory CQ of C≤ whose complexified Grothendieck ring is isomorphic to the coordinate ring C[N] of a maximal unipotent subgroup. In this paper, we define an algebraic morphism D on a torus Y≤ containing the image of K0(C≤ ) under the truncated q-character morphism. We prove that the restriction of D to K0(CQ) coincides with the morphism D recently introduced by Baumann-Kamnitzer-Knutson in their study of equivariant multiplicities of Mirkovi\'c-Vilonen cycles. This is achieved using the T-systems satisfied by the characters of Kirillov-Reshetikhin modules in CQ, as well as certain results by Brundan-Kleshchev-McNamara on the representation theory of quiver Hecke algebras. This alternative description of D allows us to prove a conjecture by the first author on the distinguished values of D on the flag minors of C[N]. We also provide applications of our results from the perspective of Kang-Kashiwara-Kim-Oh's generalized Schur-Weyl duality. Finally, we define a cluster algebra AQ as a subquotient of K0(C≤ ) naturally containing C[N], and suggest the existence of an analogue of the Mirkovi\'c-Vilonen basis in AQ on which the values of D may be interpreted as certain equivariant multiplicities.