Toshiyuki Kobayashi
Published 2019-07-18Version 1
We give a complete description of the discrete spectra in the branching law $\Pi|_{G'}$ with respect to the pair $(G,G')=(O(p,q), O(p',q') \times O(p'',q''))$ for irreducible unitary representations $\Pi$ of $G$ that are "geometric quantization" of minimal elliptic coadjoint orbits. We also construct explicitly all holographic operators and prove a closed Parseval-type formula.
Restriction of irreducible unitary representations of Spin(N,1) to parabolic subgroups
Characters of irreducible unitary representations of $U(n, n+1)$ via double lifting from $U(1)$
The Schrodinger model for the minimal representation of the indefinite orthogonal group O(p, q)
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