On a general density theorem (Q6595595)

In this paper under review, the author relies on a prior work of \textit{G. Halász} and \textit{P. Turán} [J. Number Theory 1, 121--137 (1969; Zbl 0174.08101)] to establish a general zero-density theorem for a large class of Dirichlet series, containing the Riemann and Dedekind zeta functions. More precisely, we consider \N\[\Nf(s)=\sum_{n=1}^\infty \frac{f_n}{n^s}, \quad g(s)=\frac{1}{f(s)}= \sum_{n=1}^\infty \frac{g_n}{n^s}\N\]\Nto be analytic for \(\sigma>1\) and \N\[\Nf_n\ll n^\Delta, \quad g_n\ll n^\Delta,\quad \text{for every } \Delta>0.\N\]\NFurther, we suppose that \(f(s)\) can be continued as an analytic function to the half-plane \(\sigma\geq\alpha_f\), \(\alpha_f < 1\), up to a simple pole at \(s = 1\) with residue \(f_0\). It is natural to define \(\mu_f(\sigma)\) the analogue of Lindelöf's \(\mu\)-function for \(f(s)\) in place of the Riemann zeta function \(\zeta(s)\). Let define \N\[\N\lambda_f(\eta)=\min_{a\geq 0;\, (a+1)\eta\leq 1-\alpha_f}\frac{\mu_f(1-(a+1)\eta)}{a\eta}. \N\]\NThe main result of this paper is to express the density estimates \N\[\NN_f(1-\eta, T):=\sum_{\substack{f(\beta+i\gamma)=0\\ \beta \geq 1-\eta;\, |\gamma|\leq T}}1\ll_{\eta,\varepsilon} T^{B_f(\eta)\eta+\varepsilon}\N\]\Nas a function of \(\lambda_f\) and \(\lambda_\zeta\).