A new interpretation of the Racah-Wigner 6j-symbol and the classification of uniserial sl(2) V(m)-modules

Abstract

All Lie algebras and representations will be assumed to be finite dimensional over the complex numbers. Let V(m) be the irreducible (2)-module with highest weight m≥ 1 and consider the perfect Lie algebra =(2) V(m). Recall that a -module is uniserial when its submodules form a chain. In this paper we classify all uniserial -modules. The main family of uniserial -modules is actually constructed in greater generality for the perfect Lie algebra = V(μ), where is a semisimple Lie algebra and V(μ) is the irreducible -module with highest weight μ≠ 0. The fact that the members of this family are, but for a few exceptions of lengths 2, 3 and~4, the only uniserial (2) V(m)-modules depends in an essential manner on the determination of certain non-trivial zeros of Racah-Wigner 6j-symbol.