Principal series of Hermitian Lie groups induced from Heisenberg parabolic subgroups
Abstract
Let G be an irreducible Hermitian Lie group and D=G/K its bounded symmetric domain in Cd of rank r. Each γ of the Harish-Chandra strongly orthogonal roots \γ1, ·s, γr\ defines a Heisenberg parabolic subgroup P=MAN of G. We study the principal series representations PG(1 e 1) of G induced from P. We find the complementary series, reduction points, and unitary subrepresentations in this family of representations.
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