Interpolation and duality in spaces of pseudocontinuable functions
Abstract
Given an inner function θ on the unit disk, let Kpθ:=Hpθ zHp be the associated star-invariant subspace of the Hardy space Hp. Also, we put K*θ:=K2θ BMO. Assuming that B=B Z is an interpolating Blaschke product with zeros Z=\zj\, we characterize, for a number of smoothness classes X, the sequences of values W=\wj\ such that the interpolation problem f| Z= W has a solution f in K2B X. Turning to the case of a general inner function θ, we further establish a non-duality relation between K1θ and K*θ. Namely, we prove that the latter space is properly contained in the dual of the former, unless θ is a finite Blaschke product. From this we derive an amusing non-interpolation result for functions in K*B, with B=B Z as above.
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