On the centers of cyclotomic quiver Hecke algebras

Abstract

Let n∈N and K be any field. For any symmetric generalized Cartan matrix A, any β in the positive root lattice with height n and any integral dominant weight , one can associate a quiver Hecke algebras Rβ(K) and its cyclotomic quotient Rβ(K) over K. It has been conjectured that the natural map from Rβ(K) to Rβ(K) maps the center of Rβ(K) surjectively onto the center of Rβ(K). A similar conjecture claims that the center of the affine Hecke algebra of type A maps surjectively onto the center of its cyclotomic quotient---the cyclotomic Hecke algebra Hn of type G(,1,n) over K. In this paper, we prove these two conjectures affirmatively. As a consequence, we show that the center of Hn is stable under base change and it has dimension equal to the number of -partitions of n. Finally, as a byproduct, we also verify a conjecture of Shan, Varagnolo and Vasserot on the grading structure of the center of Rβ(K).