A remark on Ramanujan sums. (Q2570036)

Let \(c_q(n)= \sum_{(r,q)=1} e^{2\pi i{n\over q}r}\) be the Ramanujan sum. The author studies the asymptotic behaviour of the function \(A(q)= \sup_{x< y} | \sum_{x< n\leq y} c_q(n)|\). He proves \(q\ll A(q)\ll q\sqrt{\log\log q}\) uniformly in \(q> 1\). For some sets of primes \(q\) with a logarithmic density he gets better estimates.