Note on a problem of Nathanson related to the -Sidon set

Abstract

Let (x1, …, xh)=c1 x1+·s+ch xh be a linear form with coefficients in a field F, and let V be a vector space over F. A nonempty subset A of V is a -Sidon set if (a1, …, ah)=(a1, …, ah) implies (a1, …, ah)= (a1, …, ah) for all h-tuples (a1, …, ah) ∈ Ah and (a1, …, ah) ∈ Ah. We call A a polynomial perturbation of B if for some r>0 and positive integer k0, |ak-bk|< kr holds for all integers k ≥ k0. In this paper, for a given set B, we prove that there exists a -Sidon set A of integers that is a polynomial perturbation of B. This gives an affirmative answer to a recent problem of Nathanson. Some other results are also proved.