Cyclicity and invariant subspaces in the Dirichlet spaces
Abstract
Let μ be a positive finite measure on the unit circle and D (μ) the associated Dirichlet space. The generalized Brown-Shields conjecture asserts that an outer function f ∈ D (μ ) is cyclic if and only if c\μ (Z (f))= 0, where c\μ is the capacity associated with D (μ) and Z(f) is the zero set of f. In this paper we prove that this conjecture is true for measures with countable support. We also give in this case a complete and explicit characterization of invariant subspaces.
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