Improved lower bounds for strong $n$-conjectures
Abstract
The well-known -conjecture concerns triples of non-zero integers that are coprime and satisfy . The strong -conjecture is a generalisation to summands where integer solutions of the equation are considered such that the are pairwise coprime and satisfy a certain subsum condition. Ramaekers studied a variant of this conjecture with a slightly different set of conditions. He conjectured that in this setting the limit superior of the so-called qualities of the admissible solutions equals for any . In this article, we follow results of Konyagin and Browkin. We restrict to a smaller, and thus more demanding, set of solutions, and improve the known lower bounds on the limit superior: for we achieve a lower bound of ; for odd we even achieve . In particular, Ramaekers's conjecture is false for every .
Keywords
Cite
@article{arxiv.2409.13439,
title = {Improved lower bounds for strong $n$-conjectures},
author = {Rupert Hölzl and Sören Kleine and Frank Stephan},
journal= {arXiv preprint arXiv:2409.13439},
year = {2025}
}