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Rank and matrix coefficients for simply laced groups
-
Hung Yean Loke
und
Gordan Savin
Veröffentlicht/Copyright:
7. Dezember 2006
Abstract
Let G be a simple, simply connected Chevalley group of type E over a local field k of characteristic 0. In this paper, we show that, amongst all non-trivial irreducible unitary representations of G, the matrix coefficients of the (unique) minimal representation of G have the slowest decay.
Received: 2004-12-01
Revised: 2005-10-02
Published Online: 2006-12-07
Published in Print: 2006-10-01
© Walter de Gruyter
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- Khintchine type inequalities for reduced free products and applications
- The analogue of the Dedekind eta function for CY manifolds I
- On deformations of ℚ-factorial symplectic varieties
- Uniformization of Deligne-Mumford curves
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Artikel in diesem Heft
- Mappings of finite distortion: Capacity and modulus inequalities
- Khintchine type inequalities for reduced free products and applications
- The analogue of the Dedekind eta function for CY manifolds I
- On deformations of ℚ-factorial symplectic varieties
- Uniformization of Deligne-Mumford curves
- A T1 theorem for integral transformations with operator-valued kernel
- Rank and matrix coefficients for simply laced groups
- A K-theoretic proof of Boutet de Monvel's index theorem for boundary value problems
