A unified approach to construction of Gelfand-Tsetlin-Zhelobenko base vectors for series A, B, C, D

Abstract

Using the Zhelobenko's approach we investigate a branching of an irreducible representation of gn under the restriction of algebras gn gn-1, where gn is a Lie algebra of type Bn, Cn, Dn or a Lie algebra of type A, where in this case we put gn=gln+1, gn-1=gln-1. We give a new explicit description of the space of the gn-1-highest vectors, then we construct a base in this space. The case n=2 is considered separately for different algebras, but a passage from n=2 to an arbitrary n is the same for all series A, B, C, D. This new procedure has the following advantage: it establishes a relation between spaces of gn-1-highest vectors for different series of algebras. This procedure describes an extension of Gelfand-Tsetlin tableaux to the left.