Representations of the n dimensional quantum torus

Abstract

The n-dimensional quantum torus O q((F×)n) is defined as the associative F-algebra generated by x1, ·s, xn together with their inverses satisfying the relations xixj = qijxjxi, where q = (qij). We show that the modules that are finitely generated over certain commutative sub-algebras B are B-torsion-free and have finite length. We determine the Gelfand-Kirillov dimensions of simple modules in the case when \[ ( O q((F×)n)) = n - 1, \] where stands for the Krull dimension. In this case if M is a simple O q((F×)n)-module then (M) = 1 or \[ (M) ( O q((F×)n)) - ( Z( O q((F×)n))) - 1,\] where Z(C) stands for the center of an algebra C. We also show that there always exists a simple F A-module satisfying the above inequality.