English

Improved lower bounds for strong $n$-conjectures

Number Theory 2025-07-17 v2

Abstract

The well-known abcabc-conjecture concerns triples (a,b,c)(a,b,c) of non-zero integers that are coprime and satisfy a+b+c=0{a+b+c=0}. The strong nn-conjecture is a generalisation to nn summands where integer solutions of the equation a1++an=0{a_1 + \ldots + a_n = 0} are considered such that the aia_i 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 11 for any nn. 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 n6{n \geq 6} we achieve a lower bound of 54\frac54; for odd n5n \geq 5 we even achieve 53\frac53. In particular, Ramaekers's conjecture is false for every n5{n \ge 5}.

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}
}
R2 v1 2026-06-28T18:51:18.514Z