Banach space representations of Drinfeld-Jimbo algebras and their complex-analytic forms

Abstract

We prove that every non-degenerate Banach space representation of the Drinfeld-Jimbo algebra Uq(g) of a semisimple complex Lie algebra g is finite dimensional when |q| 1. As a corollary, we find an explicit form of the Arens-Michael envelope of Uq(g), which is similar to that of U(g) obtained by Joseph Taylor in 70s. In the case when g=sl2, we also consider the representation theory of the corresponding analytic form U(sl2) (with e=q) and show that it is simpler than for Uq(sl2). For example, all irreducible continuous representations of U(sl2) are finite dimensional for every admissible value of the complex parameter , while Uq(sl2) has a topologically irreducible infinite-dimensional representation when |q|= 1 and q is not a root of unity.