Cyclic polynomials in Dirichlet-type Spaces of the unit bidisk
Abstract
For α∈ R, we consider the scale of function spaces, namely the Dirichlet-type space Dα consisting of holomorphic functions on the unit bidisk D2, f(z,w)=Σk,l=0∞aklzkwl such that Σk,l=0∞(k+l+1)α|akl|2 < ∞. In this paper, we solve an open problem posed by Torkinejad Ziarati concerning the cyclicity of the polynomial 2-z1-z2 in Dα for 32 < α≤ 2. We provide an affirmative answer and, as a consequence, complete the characterization of cyclic polynomials in Dα.
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