The classification of the cyclic sl(n+1) Cn+1--modules

Abstract

In this paper we classify all the cyclic finite dimensional indecomposable\\ modules of the perfect Lie algebras sl(n+1) Cn+1, given by the semidirect sum of the simple Lie algebra An with its standard representation. Furthermore, using the embeddings of the Lie algebras sl(n+1) Cn+1 in sl(n+2), we show that any finite dimensional irreducible module of sl(n+2) restricted to sl(n+1) Cn+1 is a cyclic module and that any cyclic sl(n+1) Cn+1--modules can be constructed as quotient module of the restriction to sl(n+1) Cn+1 of some finite dimensional irreducible sl(n+2)--modules. This explicit realization of the cyclic sl(n+1) Cn+1--modules plays a role in their classification.