Toshiyuki Kobayashi
Published 2013-12-31, updated 2014-05-09Version 2
For a pair of reductive groups $G \supset G'$, we prove a geometric criterion for the space $Sh(\lambda, \nu)$ of Shintani functions to be finite-dimensional in the Archimedean case. This criterion leads us to a complete classification of the symmetric pairs $(G,G')$ having finite-dimensional Shintani spaces. A geometric criterion for uniform boundedness of $dim Sh(\lambda, \nu)$ is also obtained. Furthermore, we prove that symmetry breaking operators of the restriction of smooth admissible representations yield Shintani functions of moderate growth, of which the dimension is determined for $(G, G') = (O(n+1,1), O(n,1))$.
Comments: to appear in Progress in Mathematics, Birkhauser
Symmetry breaking for representations of rank one orthogonal groups
Symmetry breaking operators for strongly spherical reductive pairs and the Gross-Prasad conjecture for complex orthogonal groups
The compact picture of symmetry breaking operators for rank one orthogonal and unitary groups
![QR code for arXiv:1401.0117 [math.RT]](http://oss.arxitics.com/images/favicon.svg)