Free Jordan Algebras and Representations of sl2(J)

Abstract

Let J be a unital Jordan algebra, and let sl2(J) be the universal central extension of its Tits-Kantor-Koecher Lie algebra. In Part A, we study the category of (sl2(J), SL2(K))-modules. We characterize the dominant J-spaces, which are analogous to the dominant highest weights appearing in classical settings. A family of universal envelopes Un(J) associated to such modules is introduced and studied. We also prove some finiteness theorems. In Part C, we define the notion of smooth sl2(J)-modules for augmented Jordan algebras J, and investigate the category of smooth modules in the spirit of Cline-Parshall-Scott highest weight categories. We show that the standard modules of this category are finite dimensional when J is finitely generated. The free unital Jordan algebra J(D) over D variables is an elusive object, but finiteness and Ext-vanishing properties suggest that the smooth sl2(J(D))-modules with even eigenvalues might form a generalized highest weight category. However, we prove that such an assertion would contradict recently obtained information about the growth of free Jordan algebras. See [24] and [13] for more details. It then follows that the category of smooth sl2(J(D))-modules with even eigenvalues is not a generalized highest weight category when D≥ 2. Surprisingly, the proofs of most of these results make use of deep theorems of E. Zelmanov.

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