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Main Authors: Pierce, Lillian B., Turnage-Butterbaugh, Caroline L., Zaman, Asif
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2504.16233
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author Pierce, Lillian B.
Turnage-Butterbaugh, Caroline L.
Zaman, Asif
author_facet Pierce, Lillian B.
Turnage-Butterbaugh, Caroline L.
Zaman, Asif
contents A Tauberian theorem deduces an asymptotic for the partial sums of a sequence of non-negative real numbers from analytic properties of an associated Dirichlet series. Tauberian theorems appear in a tremendous variety of applications, ranging from well-known classical applications in analytic number theory, to new applications in arithmetic statistics, group theory, and the intersection of number theory and algebraic geometry. The goal of this article is to provide a useful reference for practitioners who wish to apply a Tauberian theorem. We explain the hypotheses and proofs of two types of Tauberian theorems: one with and one without an explicit remainder term. We furthermore provide counterexamples that illuminate that neither theorem can reach an essentially stronger conclusion unless its hypothesis is strengthened.
format Preprint
id arxiv_https___arxiv_org_abs_2504_16233
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A guide to Tauberian theorems for arithmetic applications
Pierce, Lillian B.
Turnage-Butterbaugh, Caroline L.
Zaman, Asif
Number Theory
A Tauberian theorem deduces an asymptotic for the partial sums of a sequence of non-negative real numbers from analytic properties of an associated Dirichlet series. Tauberian theorems appear in a tremendous variety of applications, ranging from well-known classical applications in analytic number theory, to new applications in arithmetic statistics, group theory, and the intersection of number theory and algebraic geometry. The goal of this article is to provide a useful reference for practitioners who wish to apply a Tauberian theorem. We explain the hypotheses and proofs of two types of Tauberian theorems: one with and one without an explicit remainder term. We furthermore provide counterexamples that illuminate that neither theorem can reach an essentially stronger conclusion unless its hypothesis is strengthened.
title A guide to Tauberian theorems for arithmetic applications
topic Number Theory
url https://arxiv.org/abs/2504.16233