GCD sums and complete sets of square-free numbers

Abstract

It is proved that \[ Σk,=1N(nk,n)nk n N(C N N N) \] holds for arbitrary integers 1 n1<·s < nN. This bound is essentially better than that found in a recent paper of Aistleitner, Berkes, and Seip and can not be improved by more than possibly a power of 1/ N. The proof relies on ideas from classical work of G\'al, the method of Aistleitner, Berkes, and Seip, and a certain completeness property of extremal sets of square-free numbers.