English

On the local Bump-Friedberg L function II

Number Theory 2016-06-07 v4 Representation Theory

Abstract

Let FF be a pp-adic field with residue field of cardinality qq. To each irreducible representation of GL(n,F)GL(n,F), we attach a local Euler factor LBF(qs,qt,π)L^{BF}(q^{-s},q^{-t},\pi) via the Rankin-Selberg method, and show that it is equal to the expected factor L(s+t+1/2,ϕπ)L(2s,Λ2ϕπ)L(s+t+1/2,\phi_\pi)L(2s,\Lambda^2\circ \phi_\pi) of the Langlands' parameter ϕπ\phi_\pi of π\pi. The corresponding local integrals were introduced in [BF], and studied in [M15]. This work is in fact the continuation of [M15]. The result is a consequence of the fact that if δ\delta is a discrete series representation of GL(2m,F)GL(2m,F), and χ\chi is a character of Levi subgoup L=GL(m,F)×GL(m,F)L=GL(m,F)\times GL(m,F), trivial on GL(m,F)GL(m,F) embedded diagonally, then δ\delta is (L,χ)(L,\chi)-distinguished if an only if it admits a Shalika model, a result which was only established for χ=1\chi=1 before.

Keywords

Cite

@article{arxiv.1411.6046,
  title  = {On the local Bump-Friedberg L function II},
  author = {Nadir Matringe},
  journal= {arXiv preprint arXiv:1411.6046},
  year   = {2016}
}

Comments

This version is to appear in Manuscripta Mathematica

R2 v1 2026-06-22T07:08:04.897Z