Examples of critically cyclic functions in the Dirichlet spaces of the ball
Abstract
In this work, we construct examples of holomorphic functions in D2(2), the Dirichlet space on 2, for which there exists an index αc ∈ [12,2] such that the function is cyclic in Dα(2) if and only if α ≤ αc. To this end, we use the notion of interpolation sets in smooth ball algebras, as studied by Bruna, Ortega, Chaumat, and Chollet.
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