Abstract
Given a non-negative weight v, not necessarily bounded or strictly positive, defined on a domain G in the complex plane, we consider the weighted space \({{H}_{v}^{\infty }}(G)\) of all holomorphic functions on G such that the product v|f| is bounded in G and study the question of when such a space is complete under the canonical sup-seminorm. We obtain both some necessary and some sufficient conditions in terms of the weight v, exhibit several relevant examples, and characterize completeness in the case of spaces with radial weights on balanced domains.
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Dedicated to the memory of Paweł Domański (1959–2016).
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Bonet, J., Vukotić, D. A Note on Completeness of Weighted Normed Spaces of Analytic Functions. Results Math 72, 263–279 (2017). https://doi.org/10.1007/s00025-017-0696-2
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DOI: https://doi.org/10.1007/s00025-017-0696-2