Representation of integers by cyclotomic binary forms
Number Theory
2017-12-27 v1
Abstract
The homogeneous form of degree which is associated with the cyclotomic polynomial is dubbed a {\it cyclotomic binary form}. A positive integer is said to be {\it representable by a cyclotomic binary form} if there exist integers with and such that . We prove that the number of such representations of by a cyclotomic binary form is finite. More precisely, we have and We give a description of the asymptotic cardinality of the set of values taken by the forms for . This will imply that the set of integers such that has natural density 0. We will deduce that the average value of the integers among the nonzero values of grows like .
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