On the wandering property in Dirichlet spaces
Abstract
We show that in a scale of weighted Dirichlet spaces Dα, including the Bergman space, given any finite Blaschke product B there exists an equivalent norm in Dα such that B satisfies the wandering subspace property with respect to such norm. This extends, in some sense, previous results by Carswell, Duren and Stessin. As a particular instance, when B(z)=zk and |α| ≤ (2)(k+1), the chosen norm is the usual one in Dα.
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