On induced representations of Lie algebras, groups and coalgebras

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

We study holomorphically induced representations r of Lie groups G=exp g from weak polarizations h at f ¥ g\*. When G is a connected and simply connected Lie group whose Lie algebra is a normal j-algebra, we obtain a sufficient condition for non-vanishing of r and the decomposition of r into irreduc

Let F be a field of characteristic p ) 0, L a generalized restricted Lie algebra Ž . over F, and P L the primitive p-envelope of L. A close relation between Ž . L-representations and P L -representations is established. In particular, the irreducible -reduced modules of L for any g L\* coincide with

We present an algorithm for the computation of representations of a Lie algebra acting on its universal enveloping algebra. This is a new algorithm which permits the effective computation of these representations and of the matrix elements of the corresponding Lie group. The approach is based on a m