Optimal interpolation in Hardy and Bergman spaces: a reproducing kernel Banach space approach

Abstract

After a review of the reproducing kernel Banach space framework and semi-inner products, we apply the techniques to the setting of Hardy spaces Hp and Bergman spaces Ap, 1<p<∞, on the unit ball in Cn, as well as the Hardy space on the polydisk and half-space. In particular, we show how the framework leads to a procedure to find a minimal norm element f satisfying interpolation conditions f(zj)=wj, j=1,… , n. We also explain the techniques in the setting of p spaces where the norm is defined via a change of variables and provide numerical examples.

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