Weight-finite modules over the quantum affine and double quantum affine algebras of type a1

Abstract

We define the categories of weight-finite modules over the type a1 quantum affine algebra Uq( a1) and over the type a1 double quantum affine algebra Uq( a1) that we introduced in a previous paper. In both cases, we classify the simple objects in those categories. In the quantum affine case, we prove that they coincide with the simple finite-dimensional Uq( a1)-modules which were classified by Chari and Pressley in terms of their highest (rational and -dominant) -weights or, equivalently, by their Drinfel'd polynomials. In the double quantum affine case, we show that simple weight-finite modules are classified by their (t-dominant) highest t-weight spaces, a family of simple modules over the subalgebra Uq0( a1) of Uq( a1) which is conjecturally isomorphic to a split extension of the elliptic Hall algebra. The proof of the classification, in the double quantum affine case, relies on the construction of a double quantum affine analogue of the evaluation modules that appear in the quantum affine setting.