English

The Bessel-Plancherel theorem and applications

Representation Theory 2012-11-27 v1

Abstract

Let GG be a simple Lie Group with finite center, and let KGK\subset G be a maximal compact subgroup. We say that GG is a Lie group of tube type if G/KG/K is a hermitian symmetric space of tube type. For such a Lie group GG, we can find a parabolic subgroup P=MANP=MAN, with given Langlands decomposition, such that NN is abelian, and NN admits a generic character with compact stabilizer. We will call any parabolic subgroup PP satisfying this properties a Siegel parabolic. Let (π,V)(\pi,V) be an admissible, smooth, Fr\'echet representation of a Lie group of tube type GG, and let PGP \subset G be a Siegel parabolic subgroup. If χ\chi is a generic character of NN, let Whχ(V)=λ:VCλ(π(n)v)=χ(n)vWh_{\chi}(V)={\lambda:V \longrightarrow \mathbb{C} | \lambda(\pi(n)v)=\chi(n)v} be the space of Bessel models of VV. After describing the classification of all the simple Lie groups of tube type, we will give a characterization of the space of Bessel models of an induced representation. As a corollary of this characterization we obtain a local multiplicity one theorem for the space of Bessel models of an irreducible representation of GG. As an application of this results we calculate the Bessel-Plancherel measure of a Lie group of tube type, L2(N\G;χ)L^2(N\backslash G;\chi), where χ\chi is a generic character of NN. Then we use Howe's theory of dual pairs to show that the Plancherel measure of the space L2(O(pr,qs)\O(p,q))L^2(O(p-r,q-s)\backslash O(p,q)) is the pullback, under the Θ\Theta lift, of the Bessel-Plancherel measure L2(N\Sp(m,R);χ)L^2(N\backslash Sp(m,\mathbb{R});\chi), where m=r+sm=r+s and χ\chi is a generic character that depends on rr and ss.

Keywords

Cite

@article{arxiv.1211.5879,
  title  = {The Bessel-Plancherel theorem and applications},
  author = {Raul Gomez},
  journal= {arXiv preprint arXiv:1211.5879},
  year   = {2012}
}

Comments

Ph.D. Thesis, UC San Diego, June 2011

R2 v1 2026-06-21T22:43:57.132Z