Riesz α-capacity of Cantor sets and cyclicity in Dirichlet-type spaces
Abstract
We examine the threshold of the cyclicity for functions in Dirichlet-type spaces Dα, α∈(0,1]. Given a fixed α*∈(0,1], we construct a holomorphic function f∈Dα* which is cyclic in Dα for all α<α*, but fails to be cyclic in Dα*. This function serves as a counterexample to the persistence of cyclicity at the critical index α*. Throughout the construction process, we work with generalized Cantor sets and study their Riesz α-capacity.
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