English

Epsilon dichotomy for linear models: the Archimedean case

Number Theory 2023-04-26 v2 Representation Theory

Abstract

Let G=GL2n(R)G=\mathrm{GL}_{2n}(\mathbb{R}) or G=GLn(H)G=\mathrm{GL}_n(\mathbb{H}) and H=GLn(C)H=\mathrm{GL}_n(\mathbb{C}) regarded as a subgroup of GG. Here, H\mathbb{H} is the quaternion division algebra over R\mathbb{R}. For a character χ\chi on C×\mathbb{C}^\times, we say that an irreducible smooth admissible moderate growth representation π\pi of GG is χH\chi_H-distinguished if HomH(π,χdetH)0\mathrm{Hom}_H(\pi, \chi\circ\det_H)\neq0. We compute the root number of a χH\chi_H-distinguished representation π\pi twisted by the representation induced from χ\chi. This proves an Archimedean analogue of the conjecture by Prasad and Takloo-Bighash (J. Reine Angew. Math., 2011). The proof is based on the analysis of the contribution of HH-orbits in a flag manifold of GG to the Schwartz homology of principal series representations. A large part of the argument is developed for general real reductive groups of inner type. In particular, we prove that the Schwartz homology H(H,πχ)H_\ast(H, \pi\otimes\chi) is finite-dimensional and hence it is Hausdorff for a reductive symmetric pair (G,H)(G, H) and a finite-dimensional representation χ\chi of HH.

Keywords

Cite

@article{arxiv.2207.00743,
  title  = {Epsilon dichotomy for linear models: the Archimedean case},
  author = {Miyu Suzuki and Hiroyoshi Tamori},
  journal= {arXiv preprint arXiv:2207.00743},
  year   = {2023}
}

Comments

26 pages, final version (to appear in IMRN)

R2 v1 2026-06-24T12:11:49.862Z