Auslander-Reiten combinatorics and q-characters of representations of affine quantum groups

Abstract

For each simple Lie algebra g of simply-laced type, Hernandez and Leclerc introduced a certain category CZ of finite-dimensional representations of the quantum affine algebra of g, as well as certain subcategories CZ≤ ξ depending on a choice of height function adapted to an orientation of the Dynkin graph of g. In our previous work we constructed an algebra homomorphism Dξ whose domain contains the image of the Grothendieck ring of CZ≤ ξ under the truncated q-character morphism χq corresponding to ξ. We exhibited a close relationship between the composition of Dξ with χq and the morphism D recently introduced by Baumann, Kamnitzer and Knutson in their study of the equivariant homology of Mirković-Vilonen cycles. In this paper, we extend Dξ in order to investigate its composition with Frenkel-Reshetikhin's original q-character morphism. Our main result consists in proving that the q-characters of all standard modules in CZ lie in the kernel of Dξ. This provides a large family of new non-trivial rational identities suggesting possible geometric interpretations.