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Bibliographic Details
Main Author: Bright, Curtis
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2301.11056
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author Bright, Curtis
author_facet Bright, Curtis
contents We prove that there exist infinitely many coprime numbers $a$, $b$, $c$ with $a+b=c$ and $c>\operatorname{rad}(abc)\exp(6.563\sqrt{\log c}/\log\log c)$. These are the most extremal examples currently known in the $abc$ conjecture, thereby providing a new lower bound on the tightest possible form of the conjecture. This builds on work of van Frankenhuysen (1999) who proved the existence of examples satisfying the above bound with the constant $6.068$ in place of $6.563$. We show that the constant $6.563$ may be replaced by $4\sqrt{2δ/e}$ where $δ$ is a constant such that all full-rank unimodular lattices of sufficiently large dimension $n$ contain a nonzero vector with $\ell_1$ norm at most $n/δ$.
format Preprint
id arxiv_https___arxiv_org_abs_2301_11056
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle A New Lower Bound in the $abc$ Conjecture
Bright, Curtis
Number Theory
Discrete Mathematics
11D75 (Primary) 11H06, 11G50, 11N25 (Secondary)
We prove that there exist infinitely many coprime numbers $a$, $b$, $c$ with $a+b=c$ and $c>\operatorname{rad}(abc)\exp(6.563\sqrt{\log c}/\log\log c)$. These are the most extremal examples currently known in the $abc$ conjecture, thereby providing a new lower bound on the tightest possible form of the conjecture. This builds on work of van Frankenhuysen (1999) who proved the existence of examples satisfying the above bound with the constant $6.068$ in place of $6.563$. We show that the constant $6.563$ may be replaced by $4\sqrt{2δ/e}$ where $δ$ is a constant such that all full-rank unimodular lattices of sufficiently large dimension $n$ contain a nonzero vector with $\ell_1$ norm at most $n/δ$.
title A New Lower Bound in the $abc$ Conjecture
topic Number Theory
Discrete Mathematics
11D75 (Primary) 11H06, 11G50, 11N25 (Secondary)
url https://arxiv.org/abs/2301.11056