λ-Mappings Between Representation Rings of Lie Algebras

Abstract

In [10] Patera and Sharp conceived a new relation, subjoining, between semisimple Lie algebras. Our objective in this paper is twofold. Firstly, to lay down a mathematical formalization of this concept for arbitrary Lie algebras. Secondly, to give a complete classification of all maximal subjoinings between Lie algebras of the same rank, of which many examples were already known to the above authors.The notion of subjoining is a generalization of the subalgebra relation between Lie algebras. To give an intuitive idea of what is involved we take a simple example. Suppose is a complex simple Lie algebra of type B₂. Let be a Cartan subalgebra of and Δ the corresponding root system. We have the standard root diagram Inside B₂ there lies the subalgebra A₁ × A₁ which can be identified with the sum of and the root spaces corresponding to the long roots of B₂.