On unitarity of some representatations of classical p-adic groups I
Marko Tadic

TL;DR
This paper investigates whether unitarizability of irreducible representations of classical p-adic groups is preserved under a certain correspondence, providing partial evidence that unitarizability is maintained in specific cases.
Contribution
It offers initial support for the conjecture that unitarizability is preserved in Jantzen's correspondence for classical p-adic groups, focusing on representations with specific infinitesimal characters.
Findings
Unitarizability of a representation implies unitarizability of its associated cuspidal line representation in certain cases.
Identifies conditions under which unitarizability is preserved for classical p-adic group representations.
Provides partial evidence supporting the preservation of unitarizability in the correspondence.
Abstract
In the case of p-adic general linear groups, each irreducible representation is parabolically induced by a tensor product of irreducible representations supported by cuspidal lines. One gets in this way a parameterization of the irreducible representations of p-adic general linear groups by irreducible representations supported by cuspidal lines. It is obvious that in this correspondence an irreducible representation of a p-adic general linear group is unitarizable if and only if all the corresponding irreducible representations supported by cuspidal lines are unitarizable. C. Jantzen has defined an analogue of such correspondence for irreducible representations of classical p-adic groups. It would have interesting consequences if one would know that the unitarizability is also preserved in this case. A purpose of this paper and its sequel, is to give some very limited support for…
Peer Reviews
No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.
Videos
No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.
Taxonomy
TopicsAdvanced Algebra and Geometry · Algebraic Geometry and Number Theory · Advanced Topics in Algebra
