New connections between harmonic analysis and the conformal bootstrap – HARMONICON

The study of spectral properties of locally symmetric spaces, particularly hyperbolic manifolds, stands as a central objective of abstract harmonic analysis, with far-reaching implications across mathematics. Despite the diverse range of tools employed to establish spectral estimates in this context, the conjecturally optimal results have remained out of reach.

In a seemingly unrelated realm, the conformal bootstrap has emerged as a powerful method of mathematical physics, used for elucidating conformal field theories (CFTs) in any number of dimensions. However, this method sheds little light on the problem of construction of higher-dimensional CFTs. Furthermore, it is ineffective in non-unitary CFTs, many of which are of great mathematical interest.

Recently, the principal investigator discovered surprising connections between harmonic analysis and the conformal bootstrap. This convergence has already yielded rigorous new and nearly sharp bounds on the spectra of hyperbolic manifolds while providing a broader context for Viazovska’s groundbreaking solution of the sphere packing problem.

The goal of the proposed program is to dramatically extend the emerging interplay between harmonic analysis and conformal field theory in general dimension and use it to achieve quantitative breakthroughs on both sides of the correspondence.

Firstly, I will apply conformal bootstrap methods to establish novel estimates on the spectral data of locally symmetric spaces. In arithmetic cases, this approach will improve upon the state-of-the-art bounds on the corresponding L-functions.

Secondly, I will formulate higher-dimensional conformal field theory rigorously in the framework of abstract harmonic analysis. A previously overlooked notion of positivity which emerges in the new formulation will allow me to extend the conformal bootstrap to nonunitary CFTs and thereby establish novel estimates on their scaling exponents.