Piecewise dominant sequences and the cocenter of the cyclotomic quiver Hecke algebras

Abstract

We study the cocenter of the cyclotomic quiver Hecke algebra Rα associated to an arbitrary symmetrizable Cartan matrix A=(aij)i,j∈ I, ∈ P+ and α∈ Qn+. We introduce a notion called "piecewise dominant sequence" and use it to construct some explicit homogeneous elements which span the maximal degree component of the cocenter of Rα. We show that the minimal degree components of the cocenter of Rα is spanned by the image of some KLR idempotent e(), where each ∈ Iα is piecewise dominant. As an application, we show that the weight space L()-α of the irreducible highest weight module L() over g(A) is nonzero (equivalently, Rα≠ 0) if and only if there exists a piecewise dominant sequence ∈ Iα.