On the density of coprime tuples of the form $(n,\lfloor f_1(n)\rfloor,\ldots,\lfloor f_k(n)\rfloor)$, where $f_1,\ldots,f_k$ are functions from a Hardy field

Florian Karl Richter

doi:10.1007/978-3-319-55357-3_5

On the density of coprime tuples of the form (n, f1(n),…, fk(n)), where f1,…,fk are functions from a Hardy field

Abstract

Let k∈N and let f1,…,fk belong to a Hardy field. We prove that under some natural conditions on the k-tuple (f1,…,fk) the density of the set \n∈ N: gcd(n, f1(n),…, fk(n))=1\ exists and equals 1ζ(k+1), where ζ is the Riemann zeta function.

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