Irreducible representations of infinite-dimensional Lie algebras

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

In this work a large number of irreducible representations with finite dimensional weight spaces are constructed for some toroidal Lie algebras. To accomplish this we develop a general theory of ‫ޚ‬ n -graded Lie algebras with polynomial multiplication. We construct modules by the standard inducing

We present a combinatorial algorithm for computing dimensions of irreducible representations of all nine types of simple Lie algebras over complexes. We implemented it on a programmable desk calculator. In conclusion some physical applications are discussed. ## Various formulas have been given [1-3

We present an explicit description of the ᒅ-support supp M of any irreducible ᒅ-locally finite ᒄ-module M, where ᒄ is any finite-dimensional Lie algebra and ᒅ is an arbitrary nilpotent Lie subalgebra of ᒄ. If ᒅ contains a Cartan subalgebra of the semi-simple part of ᒄ, we reformulate the description

In this paper we investigate the irreducibility of certain modules for the Lie-algebra of diffeomorphisms of torus T d . The Lie-algebra of diffeomorw " 1 " 1 x Ž phisms can be described as the derivations of A s C t , . . . t see 1 d w x. w x RSS . We denote this Lie-algebra by Der A. Larsson L1 co