The Weyl bound for triple product L-functions

Valentin Blomer; Subhajit Jana; Paul D. Nelson

arXiv:2101.12106·math.NT·July 6, 2023

The Weyl bound for triple product L-functions

Valentin Blomer, Subhajit Jana, Paul D. Nelson

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TL;DR

This paper establishes a Weyl-type subconvex bound for triple product L-functions involving automorphic representations, advancing understanding of their growth and bounds in the context of large conductors.

Contribution

It proves a new subconvex bound of Weyl-type for triple product L-functions with large conductor representations, including Eisenstein series cases.

Findings

01

Established a subconvex bound for $L(1/2, \, \pi_1 \otimes \pi_2 \otimes \pi_3)$

02

Derived a Weyl-type subconvex bound for $L(1/2 + it, \, \pi_1 \otimes \pi_2)$ with Eisenstein series

03

Advances bounds for automorphic L-functions with large conductors

Abstract

Let $π_{1}, π_{2}, π_{3}$ be three cuspidal automorphic representations for the group $SL (2, Z)$ , where $π_{1}$ and $π_{2}$ are fixed and $π_{3}$ has large conductor. We prove a subconvex bound for $L (1/2, π_{1} \otimes π_{2} \otimes π_{3})$ of Weyl-type quality. Allowing $π_{3}$ to be an Eisenstein series we also obtain a Weyl-type subconvex bound for $L (1/2 + i t, π_{1} \otimes π_{2})$ .

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Taxonomy

TopicsAdvanced Algebra and Geometry · Coding theory and cryptography · Analytic Number Theory Research