Angular Derivatives and Boundary Values of H(b) Spaces of Unit Ball of Cn
Abstract
In this work we study deBranges-Rovnyak spaces, H(b), on the unit ball of Cn. We give an integral representation of the functions in H(b) through the Clark measure on Sn associated with b. A characterization of admissible boundary limits is given in relation with finite angular derivatives. Lastly, we examine the interplay between Clark measures and angular derivatives showing that Clark measure associated with b has an atom at a boundary point if and only if b has finite angular derivative at the same point.
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