Estimates for coefficients of certain \(L\)-functions
From MaRDI portal
Publication:331074
DOI10.1007/s00605-016-0887-zzbMath1404.11062OpenAlexW2288993502MaRDI QIDQ331074
Publication date: 26 October 2016
Published in: Monatshefte für Mathematik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00605-016-0887-z
Fourier coefficients of automorphic forms (11F30) Langlands (L)-functions; one variable Dirichlet series and functional equations (11F66) Automorphic forms, one variable (11F12)
Related Items
Cancellation of two classes of dirichlet coefficients over Beatty sequences ⋮ On sums of Fourier coefficients of Maass cusp forms
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- First moments of Fourier coefficients of \(\mathrm{GL}(r)\) cusp forms
- On sums of Fourier coefficients of cusp forms
- Local coefficients as Artin factors for real groups
- A nonvanishing result for twists of \(L\)-functions of \(\text{GL}(n)\)
- A proof of Langlands' conjecture on Plancherel measures; complementary series for \(p\)-adic groups
- Cuspidality of symmetric powers with applications.
- Functorial products for \(\text{GL}_2\times \text{GL}_3\) and the symmetric cube for \(\text{GL}_2\).
- Zeros of principal \(L\)-functions and random matrix theory
- On averages of Fourier coefficients of Maass cusp forms
- Second order average estimates on local data of cusp forms
- Functional equations with multiple gamma factors and the average order of arithmetical functions
- SUMS OF FOURIER COEFFICIENTS OF CUSP FORMS
- On sums involving coefficients of automorphic $L$-functions
- Fourier Transforms of Intertwining Operators and Plancherel Measures for GL(n)
- On Certain L-Functions
- On Euler Products and the Classification of Automorphic Representations I
- On Euler Products and the Classification of Automorphic Forms II
- A relation between automorphic representations of ${\rm GL}(2)$ and ${\rm GL}(3)$
- Estimates for Coefficients of L-Functions. IV
- Functoriality for the exterior square of 𝐺𝐿₄ and the symmetric fourth of 𝐺𝐿₂
