Jordan algebras and weight modules

Abstract

We consider bounded weight modules for the universal central extension sl2(J) of the Tits-Kantor-Koecher algebra of a unital Jordan algebra J. Universal objects called Weyl modules are introduced and studied, and a combinatorial dominance criterion is given for analogues of highest weights. Specializing J to the free Jordan algebra J(r) of rank r, the category Cfin of finite-dimensional Z-graded sl2(J)-modules shares many properties with the representation theory of algebraic groups. Using a deep result of Zelmanov, we show that this subcategory admits Weyl modules. By analogy, we conjecture that Cfin is a highest weight category. The resulting homological properties would then imply cohomological vanishing results previously conjectured as a way of determining graded dimensions of free Jordan algebras.

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