A characterization of unitarity of some highest weight Harish-Chandra modules

Abstract

Let L(λ) be a highest weight Harish-Chandra module with highest weight λ. When the associated variety of L(λ) is not maximal, that is, not equal to the nilradical of the corresponding parabolic subalgebra, we prove that the unitarity of L(λ) can be determined by a simple condition on the value of z = (λ + , β), where is half the sum of positive roots and β is the highest root. In the proof, certain distinguished antichains of positive noncompact roots play a key role. By using these antichains, we are also able to provide a uniform formula for the Gelfand--Kirillov dimension of all highest weight Harish-Chandra modules, generalizing our previous result for the case of unitary highest weight Harish-Chandra modules.