Integral presentations of the shifted convolution problem and subconvexity estimates for $\operatorname{GL}_n$-automorphic $L$-functions
Jeanine Van Order

TL;DR
This paper develops new integral and spectral methods to analyze the shifted convolution problem for $ ext{GL}_n$ automorphic forms over totally real fields, leading to novel subconvexity bounds for their $L$-functions.
Contribution
It introduces integral presentations reducing the problem to $ ext{GL}_2$, constructs liftings of automorphic forms, and derives the first uniform subconvexity bounds for $ ext{GL}_n$ with $n \,\geq\, 3$.
Findings
Derived new bounds for the shifted convolution problem in dimensions $n \,\geq\, 3$.
Established a uniform subconvexity bound for $ ext{GL}_n$-automorphic $L$-functions.
Connected the problem to $ ext{GL}_2$ techniques via integral and spectral methods.
Abstract
Fix an integer, and be a totally real number field. We reduce the shifted convolution problem for -function coefficients of -automorphic forms to the better-understood setting of . The key idea behind this reduction is to use the classical projection operator together with properties of its Fourier-Whittaker expansion. This allows us to derive novel integral presentations for the shifted convolution problem as Fourier-Whittaker coefficients of certain -automorphic forms on the mirabolic subgroup of or its two-fold metaplectic cover . We then construct liftings of these mirabolic forms to and its two-fold metaplectic cover to justify…
Peer Reviews
No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.
Videos
No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.
Taxonomy
TopicsAnalytic Number Theory Research · Advanced Algebra and Geometry · Algebraic Geometry and Number Theory
