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Differential operators and highest weight representations - 455

Davidson, Mark G
Part of the Memoirs of the American Mathematical Society, series
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This work concerns the representation theory of semisimple Lie groups.

From the algebraic perspective, the theory of unitarizable highest weight modules is highly developed.

The classification was given in 1981, and, more recently, even the character and nilpotent cohomology formulas have been determined for G of classical type.

However, from the analytic point of view, as originally presented by Harish-Chandra, unitarizable highest weight modules occur as subspaces of certain spaces of vector-valued polynomials, or, equivalently, as subspaces of holomorphic sections for vector bundles on G/K.

The main results of this book offer characterizations of unitary highest weight representations as solutions to systems of differential operators.

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Product Details
American Mathematical Society
1470408813 / 9781470408817
eBook (Adobe Pdf)
510 s
30/07/1991
English
99 pages
Copy: 20%; print: 20%
PB Mathematics, PBF Algebra
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