Evaluation-type deformed modules over the quantum affine vertex algebras of type A

Abstract

Let Vc(glN) be Etingof--Kazhdan's quantum affine vertex algebra associated with the trigonometric R-matrix. We establish a connection between suitably generalized deformed φ-coordinated Vc(glN)-modules and the representations of quantized enveloping algebra Uh(glN) and reflection equation algebra Oh(MatN). As an application, we demonstrate how the elements of the center of Vc(glN) at the critical level c=-N give rise to the q-analogues of quantum immanants for Uh(glN), which were recently found by Jing, Liu and Molev. Finally, we derive the analogues of these results for the quantum affine vertex algebra associated with the normalized Yang R-matrix.