Zeros of Dirichlet polynomials
Abstract
We consider a certain class of multiplicative functions f: N → C and study the distribution of zeros of Dirichlet polynomials FN(s)= Σn N f(n)n-s corresponding to these functions. We prove that the known non-trivial zero-free half plane for Dirichlet polynomials associated to this class of multiplicative functions is optimal. We also introduce a characterization of elements in this class based on a new parameter depending on the Dirichlet series F(s) = Σn=1∞ f(n) n-s. In this context, we obtain non-trivial regions in which the associated Dirichlet polynomials do have zeros.
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