A local Douglas formula for higher order weighted Dirichlet-type integrals
Abstract
We prove a local Douglas formula for higher order weighted Dirichlet-type integrals. With the help of this formula, we study the multiplier algebra of the associated higher order weighted Dirichlet-type spaces Hμ, induced by an m-tuple μ =(μ1,…,μm) of finite non-negative Borel measures on the unit circle. In particular, it is shown that any weighted Dirichlet-type space of order m, for m≥slant 3, forms an algebra under pointwise product. We also prove that every non-zero closed Mz-invariant subspace of Hμ, has codimension 1 property if m≥slant 3 or μ2 is finitely supported. As another application of local Douglas formula obtained in this article, it is shown that for any m≥slant 2, weighted Dirichlet-type space of order m does not coincide with any de Branges-Rovnyak space H(b) with equivalence of norms.
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