English

Distance between cubics and rationals

Number Theory 2026-01-06 v2

Abstract

We investigate the following problem: what is the smallest possible distance between a cubic irrational ξ\xi and a rational number p/qp/q in terms of the height H(ξ)H(\xi) and qq? More precisely, we consider the set D3,1D_{3,1} consisting of all pairs (u,v)(u,v) of positive real numbers such that ξp/q>cHu(ξ)qv|\xi - p/q| > cH^{-u}(\xi)q^{-v} for all cubic irrationals ξ\xi and rationals p/qp/q. First, we transform this problem into one about the root separation of cubic polynomials. Second, under the assumption of the famous abc-conjecture, we give an almost complete description of D3,1D_{3,1}. Namely, the points (u,v)(u,v) with 2v32\le v\le 3 that lie in the interior of D3,1D_{3,1} are characterised by the inequality u>103vu> 10-3v. Assuming only the weaker Hall conjecture, we also obtain nontrivial results about the shape of D3,1D_{3,1}, although these are not as strong as those derived from the abc-conjecture. Finally, we discuss an analogue of the set D3,1D_{3,1} in function fields where we are able to give an almost complete description unconditionally.

Keywords

Cite

@article{arxiv.2509.01105,
  title  = {Distance between cubics and rationals},
  author = {Dmitry Badziahin},
  journal= {arXiv preprint arXiv:2509.01105},
  year   = {2026}
}

Comments

15 pages

R2 v1 2026-07-01T05:14:36.433Z