English

Distinguished representations for $\rm{SL}(n,F)$

Representation Theory 2025-11-18 v1

Abstract

Let FF be a finite field, and let E\mathbb{E} be either a quadratic field extension E/FE/F or the split algebra FFF \oplus F. We study distinguished representations of SL2n(F)\rm{SL}_{2n}(F) by the subgroup H:=SL2n(F)GLn(E)H_{\flat} := \rm{SL}_{2n}(F) \cap \rm{GL}_{n}(\mathbb{E}), which is a variation of the work of Anandavardhanan and Prasad on distinguished representations of SLn(E)\rm{SL}_{n}(\mathbb{E}) by the subgroup SLn(F)\rm{SL}_n(F). This is in a similar framework of our earlier work of a pp-adic non-split variation of Anandavardhanan-Prasad over finite fields. We give a formula for the dimension of the complex vector space HomH(π,1)\rm{Hom}_{H_{\flat}}(\pi_{\flat}, 1) in terms of certain characters of F×F^{\times}, where π\pi_{\flat} is an irreducible representation which is also distinguished by HH_{\flat}.

Keywords

Cite

@article{arxiv.2511.12299,
  title  = {Distinguished representations for $\rm{SL}(n,F)$},
  author = {Kwangho Choiy and Shiv Prakash Patel},
  journal= {arXiv preprint arXiv:2511.12299},
  year   = {2025}
}

Comments

9 pages

R2 v1 2026-07-01T07:39:13.796Z