Carlson's theorem and vertical limit functions
Abstract
We extend a classical theorem of Carlson on moments of Dirichlet series from p=2 to 1 ≤ p < ∞. When combined with the ergodic theorem for the Kronecker flow, a coherent approach to almost sure properties of vertical limit functions in Hp spaces of Dirichlet series is obtained. This allows us to establish an almost sure analytic continuation of vertical limit functions to the right half-plane that can be used to compute the Hp norm and to prove a version of Fatou's theorem.
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