Examples of de Branges-Rovnyak spaces generated by nonextreme functions
Abstract
We describe de Branges-Rovnyak spaces H (bα), α>0, where the function bα is not extreme in the unit ball of H∞ on the unit disk D, defined by the equality bα(z)/aα(z)=(1-z)-α, z∈ D, where aα is the outer function such that aα(0)>0 and |aα|2+|bα|2= 1 a.e. on ∂ D.
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