Graded dimensions and monomial bases for the cyclotomic quiver Hecke algebras

Abstract

In this paper we give a closed formula for the graded dimension of the cyclotomic quiver Hecke algebra R(β) associated to an arbitrary symmetrizable Cartan matrix A=(aij)i,j∈ I, where ∈ P+ and β∈ Qn+. As applications, we obtain some necessary and sufficient conditions for the KLR idempotent e() (for any ∈ Iβ) to be nonzero in the cyclotomic quiver Hecke algebra R(β). We prove several level reduction results which decomposes R(β) into a sum of some products of R^i(βi) with =Σii and β=Σiβi, where i∈ P+, βi∈ Q+ for each i. We construct some explicit monomial bases for the subspaces e()R(β)e(μ) and e()R(β)e(μ) of R(β), where μ∈ Iβ is arbitrary and ∈ Iβ is a certain specific n-tuple (see Section 4).Finally, we use our graded dimension formulae to provide some examples which show that R(n) is in general not graded free over its natural embedded subalgebra R(m) with m<n.