Gram Points in the Universality of the Dirichlet Series with Periodic Coefficients

Let a = { a m : m ∈ N } be a periodic multiplicative sequence of complex numbers and L ( s ; a ) , s = σ + i t a Dirichlet series with coefficients a m . In the paper, we obtain a theorem on the approximation of non-vanishing analytic functions defined in the strip 1 / 2 < σ < 1 via discrete shifts L ( s + i h t k ; a ) , h > 0 , k ∈ N , where { t k : k ∈ N } is the sequence of Gram points. We prove that the set of such shifts approximating a given analytic function is infinite. This result extends and covers that of [Korolev, M.; Laurinčikas, A. A new application of the Gram points. Aequat. Math. 2019 , 93 , 859–873]. For the proof, a limit theorem on weakly convergent probability measures in the space of analytic functions is applied.