Unitarity of highest weight Harish-Chandra modules and smoothness of Schubert varieties

Abstract

Let GR be a Lie group of Hermitian type, and L(λ) a highest weight Harish-Chandra module of GR with highest weight λ. In this article, we exhibit a bijection between the set of connected Dynkin subdiagrams containing the noncompact simple root and the set of unitary highest weight modules L(-w-), where is half the sum of positive roots. We find that L(-w-) is unitary if and only if the Schubert variety X(w) is smooth. We also give the cardinality of the set of unitary highest weight modules L(-w-) for each Kazhdan-Lusztig right cell.

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