Brand new. We distribute directly for the publisher. Bookseller Inventory #
Synopsis: Interesting classes of (g, K)-modules are often described naturally in terms of cohomologically induced representations in various settings, such as unitary highest weight modules, the theory of dual reductive pairs, discrete series for semisimple theory of dual reductive pairs, discrete series for semisimple symmetric spaces, etc. These have been stimulating the study of algebraic properties of derived functor modules. Now an almost satisfactory theory on derived functor modules, including a functorial property about unitarizability, has been developed in the good range of parameters, though some subtle problems still remain. This work treats a relatively singular part of the unitary dual of pseudo-orthogonal groups U(p, q;F) over F = R, C and H. These representations arise from discrete series for indefinite Stiefel manifolds U(p, q;F)/U(p - m, q, F)(2m 4p). Thanks to the duality theorem between d-module construction and Zuckerman's derived functor modules (ZDF-modules), these discrete series are naturally described in terms of ZF-modules with possibly singular parameters. The author's approach is algebraic and covers some parameters wandering outside the canonical Weyl cha
Title: Singular Unitary Representations and ...
Publisher: Amer Mathematical Society
Publication Date: 1992
Book Condition: New
Book Description Amer Mathematical Society, 1992. Condition: Very Good. Former Library book. Great condition for a used book! Minimal wear. Seller Inventory # GRP83371597
Book Description Amer Mathematical Society, 1992. Condition: Good. Former Library book. Shows some signs of wear, and may have some markings on the inside. Seller Inventory # GRP84104060