G\'al-type GCD sums beyond the critical line
Abstract
We prove that \[ Σk,=1N(nk,n)2α(nk n)α N2-2α ( N)b(α) \] holds for arbitrary integers 1 n1<·s < nN and 0<α<1/2 and show by an example that this bound is optimal, up to the precise value of the exponent b(α). This estimate complements recent results for 1/2 α 1 and shows that there is no "trace" of the functional equation for the Riemann zeta function in estimates for such GCD sums when 0<α<1/2.
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