An Infinite-Dimensional q-Module Obtained from the q-Shuffle Algebra for Affine sl2

Abstract

Let F denote a field, and pick a nonzero q ∈ F that is not a root of unity. Let Z4= Z/4 Z denote the cyclic group of order 4. Define a unital associative F-algebra q by generators xi i ∈ Z4 and relations q xi xi+1-q-1xi+1xiq-q-1 = 1, x3i xi+2 - 3 q x2i xi+2 xi + 3 q xi xi+2 x2i -xi+2 x3i = 0, where 3 q = (q3-q-3)/(q-q-1). Let V denote a q-module. A vector ∈ V is called NIL whenever x1 = 0 and x3 =0 and =0. The q-module V is called NIL whenever V is generated by a NIL vector. We show that up to isomorphism there exists a unique NIL q-module, and it is irreducible and infinite-dimensional. We describe this module from sixteen points of view. In this description an important role is played by the q-shuffle algebra for affine sl2.