Abstract
In this paper, we show the self-approximation property for Hurwitz zeta-functions with rational parameters. Namely, we prove that ζ(s + iατ, a/b) approximates uniformly ζ(s + iβτ, a/b) for infinitely many real τ , where α, β are arbitrary real numbers linearly independent over \( \mathbb{Q} \), and s is in a compact set lying in the open right half of the critical strip.
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