English

Representation of integers by cyclotomic binary forms

Number Theory 2017-12-27 v1

Abstract

The homogeneous form Φn(X,Y)\Phi_n(X,Y) of degree φ(n)\varphi(n) which is associated with the cyclotomic polynomial ϕn(X)\phi_n(X) is dubbed a {\it cyclotomic binary form}. A positive integer m1m\ge 1 is said to be {\it representable by a cyclotomic binary form} if there exist integers n,x,yn,x,y with n3n\ge 3 and max{x,y}2\max\{|x|, |y|\}\ge 2 such that Φn(x,y)=m\Phi_n(x,y)=m. We prove that the number ama_m of such representations of mm by a cyclotomic binary form is finite. More precisely, we have φ(n)(2/log3)logm\,\varphi(n) \le ({2}/ {\log 3})\log m\, and max{x,y}(2/3)m1/φ(n).\, \max\{|x|,|y|\} \le ({2}/{\sqrt{3}})\, m^{1/\varphi(n)}.\, We give a description of the asymptotic cardinality of the set of values taken by the forms for n3n\geq 3. This will imply that the set of integers mm such that am0a_m\neq 0 has natural density 0. We will deduce that the average value of the integers ama_m among the nonzero values of ama_m grows like logm\sqrt{\log \, m}.

Keywords

Cite

@article{arxiv.1712.09019,
  title  = {Representation of integers by cyclotomic binary forms},
  author = {Etienne Fouvry and Claude Levesque and Michel Waldschmidt},
  journal= {arXiv preprint arXiv:1712.09019},
  year   = {2017}
}

Comments

Acta Arithmetica, to appear

R2 v1 2026-06-22T23:28:43.160Z