English

Automorphic Spectra and the Conformal Bootstrap

High Energy Physics - Theory 2024-01-23 v3 Mathematical Physics math.MP Representation Theory Spectral Theory

Abstract

We describe a new method for constraining Laplacian spectra of hyperbolic surfaces and 2-orbifolds. The main ingredient is consistency of the spectral decomposition of integrals of products of four automorphic forms. Using a combination of representation theory of PSL2(R)\mathrm{PSL}_2(\mathbb{R}) and semi-definite programming, the method yields rigorous upper bounds on the Laplacian spectral gap. In several examples, the bound is nearly sharp. For instance, our bound on all genus-2 surfaces is λ13.8388976481\lambda_1\leq 3.8388976481, while the Bolza surface has λ13.838887258\lambda_1\approx 3.838887258. The bounds also allow us to determine the set of spectral gaps attained by all hyperbolic 2-orbifolds. Our methods can be generalized to higher-dimensional hyperbolic manifolds and to yield stronger bounds in the two-dimensional case. The ideas were closely inspired by modern conformal bootstrap.

Keywords

Cite

@article{arxiv.2111.12716,
  title  = {Automorphic Spectra and the Conformal Bootstrap},
  author = {Petr Kravchuk and Dalimil Mazac and Sridip Pal},
  journal= {arXiv preprint arXiv:2111.12716},
  year   = {2024}
}

Comments

v2: various improvements, especially in Section 3.9; v3: published version

R2 v1 2026-06-24T07:51:05.520Z