Cyclicity in the harmonic Dirichlet space
Abstract
The harmonic Dirichlet space D (T) is the Hilbert space of functions f ∈ L2(T) such that \|f\|D (T)2 := Σn∈Z (1+|n|)|f(n)|2 < ∞. We give sufficient conditions for f to be cyclic in D (T), in other words, for \ζ nf(ζ):\ n≥ 0\ to span a dense subspace of D (T).
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