A characterization of the unitary highest weight modules by Euclidean Jordan algebras
Abstract
Let co(J) be the conformal algebra of a simple Euclidean Jordan algebra J. We show that a (non-trivial) unitary highest weight co(J)-module has the smallest positive Gelfand-Kirillov dimension if and only if a certain quadratic relation is satisfied in the universal enveloping algebra U(co(J)C). In particular, we find an quadratic element in U(co(J)C). A prime ideal in U(co(J)C) equals the Joseph ideal if and only if it contains this quadratic element.
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