Adjoint representations of exceptional Lie algebras

In this note, we give the dimensions of some irreducible representations of exceptional Lie algebras and algebraic groups. Similar results appear in [1] for classical groups and algebras of rank at most 4. These results were produced by computer programs developed in connection with [3], where the m

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