Harmonic analysis on certain spherical varieties

TL;DR

This paper provides an explicit formula for the Fourier transform on certain spherical varieties, proving unitarity in nonarchimedean cases and advancing the understanding of harmonic analysis in this geometric setting.

Contribution

It introduces the first explicit formula for the Fourier transform on specific spherical varieties and establishes its unitarity in nonarchimedean contexts.

Findings

Explicit Fourier transform formula for spherical varieties

Proof of unitarity in nonarchimedean case

Explicit Fourier transforms on Braverman-Kazhdan spaces

Abstract

Braverman and Kazhdan proposed a conjecture, later refined by Ng\^o and broadened to the framework of spherical varieties by Sakellaridis, that asserts that affine spherical varieties admit Schwartz spaces, Fourier transforms, and Poisson summation formulae. The first author in joint work with B.~Liu and later the first two authors proved these conjectures for certain spherical varieties $Y$ built out of triples of quadratic spaces. However, in these works the Fourier transform was only proven to exist. In the present paper we give, for the first time, an explicit formula for the Fourier transform on $Y.$ We also prove that it is unitary in the nonarchimedean case. As preparation for this result, we give explicit formulae for Fourier transforms on Braverman-Kazhdan spaces attached to maximal parabolic subgroups of split, simple, simply connected groups. These Fourier transforms are of independent interest, for example, from the point of view of analytic number theory.