Minimal Affinizations of Representations of Quantum Groups: The Simply Laced Case

Let G be the split solvable Lie group acting simply transitively on a Siegel domain D. We consider irreducible unitary representations of G realized on Hilbert spaces of holomorphic functions on D. We determine all such Hilbert spaces by connecting them with positive Riesz distributions on the dual

We introduce the notion of quantum Z-algebras for the quantum affine algebra. After developing the quantum Z-algebra we use it to study the quantum affine Ž Ž .. algebra U sl 2 and construct bases for each of its higher level modules. ᮊ 1996 q Academic Press, Inc.

We present some results about the representation ring of the quantum double of a finite group over fields of arbitrary characteristic. We give a direct sum decomposition of this representation ring into ideals involving Green rings of subgroups. Given characters of such Green rings, we construct cha

The structure of the representation of the space-time translation group in relativistic quantum theory is examined by means of an operator spectral integral. There is one and only one operator-valued function on the complex forward cone which is an analytic continuation of that representation.