English

Unipotent Ideals for Spin and Exceptional Groups

Representation Theory 2021-09-23 v2

Abstract

In the monograph arXiv:2108.03453, we define the notion of a unipotent representation of a complex reductive group. The representations we define include, as a proper subset, all special unipotent representations in the sense of Barbasch-Vogan and form the (conjectural) building blocks of the unitary dual. In arXiv:2108.03453 we provide combinatorial formulas for the infinitesimal characters of all unipotent representations of linear classical groups. In this paper, we establish analogous formulas for spin and exceptional groups, thus completing the determination of the infinitesimal characters of all unipotent ideals. Using these formulas, we prove an old conjecture of Vogan: all unipotent ideals are maximal. For GG a real reductive Lie group (not necessarily complex), we introduce the notion of a unipotent representation attached to a rigid nilpotent orbit (in the complexified Lie algebra of GG). Like their complex group counterparts, these representations form the (conjectural) building blocks of the unitary dual. Using the atlas software (and the work of Adams-Miller-van Leeuwen-Vogan) we show that if GG is a real form of a simple group of exceptional type, all such representations are unitary.

Keywords

Cite

@article{arxiv.2109.09124,
  title  = {Unipotent Ideals for Spin and Exceptional Groups},
  author = {Lucas Mason-Brown and Dmytro Matvieievskyi},
  journal= {arXiv preprint arXiv:2109.09124},
  year   = {2021}
}
R2 v1 2026-06-24T06:06:48.115Z