Nonvanishing of self-dual $L$-values via spectral decomposition of shifted convolution sums
Jeanine Van Order

TL;DR
This paper develops a spectral method to prove nonvanishing of certain self-dual L-values over totally real fields, with implications for Mordell-Weil ranks of elliptic curves in number fields.
Contribution
It introduces a spectral approach to shifted convolution sums for automorphic forms, enabling nonvanishing results for higher-rank L-functions and applications to elliptic curve ranks.
Findings
Established nonvanishing estimates for self-dual L-values.
Provided bounds on Mordell-Weil ranks of elliptic curves in specific number fields.
Connected spectral methods with arithmetic applications in number theory.
Abstract
We obtain nonvanishing estimates for central values of certain self-dual Rankin-Selberg -functions on , and more generally for an integer over a totally real number field, contingent on the best known approximations towards the generalized Lindel\"of hypothesis for -automorphic forms in the level aspect, as well as the best known approximations to the generalized Ramanujan conjecture hypothesis for -automorphic forms. We proceed by developing a spectral approach to the shifted convolution problem for coefficients of -automorphic forms, accessing he higher-rank case through the classical projection operator and the…
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Taxonomy
TopicsAdvanced Algebra and Geometry · Analytic Number Theory Research · Algebraic Geometry and Number Theory
