Motohashi's Formula for the Fourth Moment of Individual Dirichlet $L$-Functions and Applications

TL;DR

This paper establishes a reciprocity formula linking the fourth moment of Dirichlet L-functions to cubic moments of automorphic forms, providing new bounds and insights in analytic number theory.

Contribution

It introduces a novel reciprocity formula connecting moments of Dirichlet L-functions with automorphic form moments, extending classical results and applications.

Findings

Derived a reciprocity formula relating fourth and cubic moments.

Established bounds for short interval fourth moments and twelfth moments.

Connected classical number theory with automorphic forms through new identities.

Abstract

A new reciprocity formula for Dirichlet $L$-functions associated to an arbitrary primitive Dirichlet character of prime modulus $q$ is established. We find an identity relating the fourth moment of individual Dirichlet $L$-functions in the $t$-aspect to the cubic moment of central $L$-values of Hecke-Maass newforms of level at most $q^{2}$ and primitive central character $\psi^{2}$ averaged over all primitive nonquadratic characters $\psi$ modulo $q$. Our formula can be thought of as a reverse version of recent work of Petrow-Young. Direct corollaries involve a variant of Iwaniec's short interval fourth moment bound and the twelfth moment bound for Dirichlet $L$-functions, which generalise work of Jutila and Heath-Brown, respectively. This work traverses an intersection of classical analytic number theory and automorphic forms.