Z\'eros des fonctions L et formes toro\"idales

TL;DR

This paper explores the relationship between zeros of L-functions and toroidal forms associated with algebraic number fields, establishing a spectral interpretation of these zeros via a Hilbert space framework.

Contribution

It introduces a novel connection between zeros of L-functions and toroidal forms, defining a Hilbert space and a self-adjoint operator whose spectrum corresponds to these zeros.

Findings

The Riemann hypothesis is equivalent to conditions on spaces of toroidal forms.

A Hilbert space and a self-adjoint operator are constructed with spectrum matching L-function zeros.

The approach links automorphic forms, Fourier coefficients, and the zeros of L-functions.

Abstract

An algebraic number field $K$ defines a maximal torus $T$ of the linear group $G = GL_{n}$. Let $\chi$ be a character of the idele class group of $K$, satisfying suitable assumptions. The $\chi$-toroidal forms are the functions defined on $G(\mathbf{Q}) Z(\mathbf{A}) \backslash G(\mathbf{A})$ such that the Fourier coefficient corresponding to $\chi$ with respect to the subgroup induced by $T$ is zero. The Riemann hypothesis is equivalent to certain conditions concerning some spaces of toroidal forms, constructed from Eisenstein series. Furthermore, we define a Hilbert space and a self-adjoint operator on this space, whose spectrum equals the set of zeroes of $L(s, \chi)$ on the critical line.