Diamond representations of rank two semisimple Lie algebras

Abstract

The present work is a part of a larger program to construct explicit combinatorial models for the (indecomposable) regular representation of the nilpotent factor N in the Iwasawa decomposition of a semi-simple Lie algebra g, using the restrictions to N of the simple finite dimensional modules of g. Such a description is given in [ABW], for the cas g=sl(n). Here, we give the analog for the rank 2 semi simple Lie algebras (of type A1× A1, A2, C2 and G2). The algebra C[N] of polynomial functions on N is a quotient, called reduced shape algebra of the shape algebra for g. Basis for the shape algebra are known, for instance the so called semi standard Young tableaux (see [ADLMPPrW]). We select among the semi standard tableaux, the so called quasi standard ones which define a kind basis for the reduced shape algebra.