Representations in L2-Spaces on Infinite-Dimensional Symmetric Cones
Neeb KH, Ørsted B (2002)
Publication Type: Journal article, Original article
Publication year: 2002
Journal
Publisher: Elsevier
Book Volume: 190
Pages Range: 133-178
Journal Issue: 1
Abstract
In this paper we study representations of the automorphism groups of classical infinite-dimensional tube domains. In particular we construct the L2-realization of all unitary highest weight representations, including the vector-valued case. We also find a projective representation of the full identity component of the affine automorphism group of the Hilbert–Schmidt version of the tube domain with trivial cocycle on the subgroup corresponding to the trace class version, but non-trivial on the large group. Finally we show that the operator-valued measures corresponding to the vector valued highest weight representations have densities of a rather weak type with respect to Wishart distributions which makes it possible to determine their “supports.”
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APA:
Neeb, K.H., & Ørsted, B. (2002). Representations in L2-Spaces on Infinite-Dimensional Symmetric Cones. Journal of Functional Analysis, 190(1), 133-178. https://dx.doi.org/10.1006/jfan.2001.3884
MLA:
Neeb, Karl Hermann, and Bent Ørsted. "Representations in L2-Spaces on Infinite-Dimensional Symmetric Cones." Journal of Functional Analysis 190.1 (2002): 133-178.
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