On contraction of Lie algebra representations

Leibniz representation of the Lie algebra ᒄ is a vector space M equipped with Ž .w x w x two actions left and right ᎐, ᎐ : ᒄ m M ª M and ᎐, ᎐ : M m ᒄ ª M which satisfy the relations \* Partially supported by Grant INTAS-93-2618. 414

Let F be an algebraically closed field of characteristic = 2, 3, W a F -vector space and The faithful irreducible L-modules are determined. It is shown that L has minimal ideals. If a minimal ideal S is infinite-dimensional then SW is a completely reducible L-module. Suppose L ∩ fgl(W ) = (0), W is

We prove the existence of a \* product on the cotangent bundle of a paralMizable manifold M. When M is a Lie group the properties of this \* product allow.us to define a linear representation of the Lie algebra of this group on L~(G), which is, in fact, the one corresponding to the usual regular rep

Many formulae in the representation theory of Lie algebras involve sums of weights, the most celebrated being that of H. Weyl [Math. Z. 24 (1926) 377-395]. In this note we will derive some elementary, but very useful, formulae for summing subsets of weights of a Lie algebra representation. We also g