Abstract :
LetFbe a field of characteristicp > 0,La generalized restricted Lie algebra overF, andP(L) the primitivep-envelope ofL. A close relation betweenL-representations andP(L)-representations is established. In particular, the irreducible κ-reduced modules ofLfor any κ L* coincide with the irreducible 0-reduced modules ofP(L), where 0 P(L)* is a trivial extension of κ. From this result, the determination of all irreducible representations of the Zassenhaus algebra is completed, and the dimensions of the corresponding modules are also given.
