Jordan-H\"older property for shifted quantum affine algebras

Abstract

We prove that finite length representations of shifted quantum affine algebras in category Osh are stable by fusion product. This implies that in the topological Grothendieck ring K0(Osh) the Grothendieck group of finite length representations forms a non-topological subring. We also conjecture this subring is isomorphic to the cluster algebra discovered in arXiv:2401.04616. In the course of our proofs, we establish that any simple representation in category Osh descends to a truncation, for certain truncation parameters as conjectured in arXiv:2010.06996 in terms of Langlands dual q-characters.