Weakly multiplicative distributions and weighted Dirichlet spaces
Abstract
We show that if u is a compactly supported distribution on the complex plane such that, for every pair of entire functions f,g, \[ u,fg= u,f u,g, \] then u is supported at a single point. As an application, we complete the classification of all weighted Dirichlet spaces on the unit disk that are de Branges-Rovnyak spaces by showing that, for such spaces, the weight is necessarily a superharmonic function.
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