Tensor products and intertwining operators for uniserial representations of the Lie algebra sl(2) V(m)

Abstract

Let gm=sl(2) V(m), m 1, where V(m) is the irreducible sl(2)-module of dimension m+1 viewed as an abelian Lie algebra. It is known that the isomorphism classes of uniserial gm-modules consist of a family, say of type Z, containing modules of arbitrary composition length, and some exceptional modules with composition length 4. Let V and W be two uniserial gm-modules of type Z. In this paper we obtain the sl(2)-module decomposition of soc(V W) by giving explicitly the highest weight vectors. It turns out that soc(V W) is multiplicity free. Roughly speaking, soc(V W)=soc(V) soc(W) in half of the cases, and in these cases we obtain the full socle series of V W by proving that soct+1(V W)=Σi=0t soci+1(V) soct+1-i(W) for all t0. As applications of these results, we obtain for which V and W, the space of gm-module homomorphisms Homgm(V,W) is not zero, in which case is 1-dimensional. Finally we prove, for m 2, that if U is the tensor product of two uniserial gm-modules of type Z, then the factors are determined by U. We provide a procedure to identify the factors from U.