Zeros of functions in Bergman-type Hilbert spaces of Dirichlet Series
Abstract
For a real number α the Hilbert spaces Dα consists of those Dirichlet series Σn=1∞ an/ns for which Σn=1∞ |an|2/[d(n)]α < ∞, where d(n) denotes the number of divisors of n. We extend a theorem of Seip on the bounded zero sequences of functions in Dα to the case α>0. Generalizations to other weighted spaces of Dirichlet series are also discussed, as are partial results on the zeros of functions in the Hardy spaces of Dirichlet series Hp, for 1≤ p <2.
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