On the maximal and minimal degree components of the cocenter of the cyclotomic KLR algebras

Abstract

Let Rα be the cyclotomic KLR algebra associated to a symmetrizable Kac-Moody Lie algebra g and polynomials \Qij(u,v)\i,j∈ I. Shan, Varagnolo and Vasserot show that, when the ground field K has characteristic 0, the degree d component of the cocenter Tr(Rα) is nonzero only if 0≤ d≤ d,α. In this paper we show that this holds true for arbitrary ground field K, arbitrary g and arbitrary polynomials \Qij(u,v)\i,j∈ I. We generalize our earlier results on the K-linear generators of Tr(Rα), Tr(Rα)0, Tr(Rα)d,α to arbitrary ground field K. Moreover, we show that the dimension of the degree 0 component Tr(Rα)0 is always equal to V()-α, where V() is the integrable highest weight U(g)-module with highest weight , and we obtain a basis for Tr(Rα)0.