English

Unitarizability in generalized rank three for classical p-adic groups

Representation Theory 2020-10-30 v2

Abstract

In an earlier paper we propose an approach to the unitarizability problem in the case of classical groups over a p-adic field of characteristic zero based on cuspidal reducibility points. We have reduced earlier the unitarizability for these groups to the case of so called weakly real representations. Following C. Jantzen, to an irreducible weakly real representation π\pi of a classical group one can attach a sequence (π1,,πk)\pi_1,\dots,\pi_k) of irreducible representations of classical groups, each of them supported by a line of cuspidal representations XρX_\rho of general linear groups containing a selfcontragredient representation ρ\rho, and an irreducible cuspidal representation σ\sigma of a classical group. The first question is if π\pi is unitarizable if and only if all πi\pi_i are unitarizable. Further, the pair ρ,σ\rho,\sigma determines the non-negative reducibility exponent αρ,σ12Z\alpha_{\rho,\sigma}\in\frac12\mathbb Z among ρ\rho and σ\sigma. The question is if the unitarizability of irreducible representations supported by XρσX_\rho\cup \sigma depends only on αρ,σ\alpha_{\rho,\sigma}. Following the above proposed strategy, in this paper we solve the unitarizability problem for irreducible subquotients of representations IndPG(τ)_P^G(\tau), where G is a classical group over a p-adic field of characteristic zero, P is a parabolic subgroup of G of the generalized rank (at most) 3 and τ\tau is an irreducible cuspidal representation of a Levi factor M of P. As a consequence, this gives also a solution of the unitarizability problem for classical p-adic groups of the split rank (at most) three. This paper also provides some very limited support for the possibility of the above approach to the unitarizability could work in general.

Keywords

Cite

@article{arxiv.1709.00630,
  title  = {Unitarizability in generalized rank three for classical p-adic groups},
  author = {Marko Tadic},
  journal= {arXiv preprint arXiv:1709.00630},
  year   = {2020}
}

Comments

The substantial revised content of this paper is in a new version under the new name "Unitarizability in Corank Three for Classical p-adic Groups " ID 2006.12609

R2 v1 2026-06-22T21:31:31.070Z