Irreducible representations of general group algebras and their applications

Quantized enveloping algebras U ᒄ and their representations provide natural settings for the action of the corresponding braid groups. Objects of particular Ž . interest are the zero weight spaces of U ᒄ -modules since they are stable under the Ž . braid group action. We show that for ᒄ s ᒐ ᒉ there

Let U be a unitary irreducible locally faithful representation of a nilpotent Lie group G, ~ the universal enveloping algebra of G, M a simple module on o//with kernel Ker dU, then there exists an automorphism of q/keeping ker dU invariant such that, after transport of structure, M is isomorphic to

An equivalent basis of icosahedral molecules is introduced in which the basis functions can be transformed under the operations in the icosahedral group (I h ). In this equivalent basis, the irreducible representation basis (IRB) of I h , including the double-valued IRB of I \* h , is deduced analyt

This paper contains some general results on irreducibility and inequivalence of representations of certain kinds of infinite dimensional Lie algebras, related to transformation groups. The main abstract theorem is a generalization of a classical result of Burnside. Applications are given, especially