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Currently displaying 1 – 11 of 11

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Jordan algebras and generalized principle series representations.

Genkai Zhang — 1995

Mathematische Annalen

Ha-Plitz Operators between Moebius Invariant Subspaces.

Genkai Zhang — 1992

Mathematica Scandinavica

Tensor Products of Weighted Bergman Spaces and Invariant Ha-Plitz Operators.

Genkai Zhang — 1992

Mathematica Scandinavica

A weighted Plancherel formula II. The case of the ball

Genkai Zhang — 1992

Studia Mathematica

The group SU(1,d) acts naturally on the Hilbert space $L ² (B d μ_{α}) (α > - 1)$ , where B is the unit ball of $ℂ^{d}$ and $d μ_{α}$ the weighted measure ${(1 - | z | ²)}^{α} d m (z)$ . It is proved that the irreducible decomposition of the space has finitely many discrete parts and a continuous part. Each discrete part corresponds to a zero of the generalized Harish-Chandra c-function in the lower half plane. The discrete parts are studied via invariant Cauchy-Riemann operators. The representations on the discrete parts are equivalent to actions on some holomorphic...

The asymptotics of spherical functions and the central limit theorem on symmetric cones

Genkai Zhang — 1995

Annales de l'institut Fourier

We prove a central limit theorem for certain invariant random variables on the symmetric cone in a formally real Jordan algebra. This extends form the previous results of Richards and Terras on the cone of real positive definite $n \times n$ matrices.

L...-versions of the Howe correspondence I.

Genkai Zhang; Bent Orsted — 1997

Mathematica Scandinavica

On the Faraut-Koranyi hypergeometric functions in rank two

Miroslav Engliš; Genkai Zhang — 2004

Annales de l’institut Fourier

We give a complete description of the boundary behaviour of the generalized hypergeometric functions, introduced by Faraut and Koranyi, on Cartan domains of rank 2. The main tool is a new integral representation for some spherical polynomials, which may be of independent interest.

Berezin transform on line bundles over bounded symmetric domains.

Zhang, Genkai — 2000

Journal of Lie Theory

Relative discrete series of line bundles over bounded symmetric domains

Anthony H. Dooley; Bent Ørsted; Genkai Zhang — 1996

Annales de l'institut Fourier

We study the relative discrete series of the $L^{2}$ -space of the sections of a line bundle over a bounded symmetric domain. We prove that all the discrete series appear as irreducible submodules of the tensor product of a holomorphic discrete series with a finite dimensional representation.