On the structure of cyclotomic nilHecke algebras

Abstract

In this paper we study the structure of the cyclotomic nilHecke algebras ,n(0), where ,n∈. We construct a monomial basis for ,n(0) which verifies a conjecture of Mathas. We show that the graded basic algebra of ,n(0) is commutative and hence isomorphic to the center Z of ,n(0). We further prove that ,n(0) is isomorphic to the full matrix algebra over Z and construct an explicit basis for the center Z. We also construct a complete set of pairwise orthogonal primitive idempotents of ,n(0). Finally, we present a new homogeneous symmetrizing form on ,n(0) by explicitly specifying its values on a given homogeneous basis of ,n(0) and show that it coincides with Shan--Varagnolo--Vasserot's symmetrizing form SVV on ,n(0).