An extension of Bohr's theorem
Abstract
The following extension of Bohr's theorem is established: If a somewhere convergent Dirichlet series f has an analytic continuation to the half-plane Cθ = \s = σ+it\,:\, σ>θ\ that maps Cθ to C \α,β\ for complex numbers α ≠ β, then f converges uniformly in Cθ+ for any >0. The extension is optimal in the sense that the assertion no longer holds should C \α,β\ be replaced with C \α\.
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