Power-series summability methods in de Branges-Rovnyak spaces
Abstract
We show that there exists a de Branges-Rovnyak space H(b) on the unit disk containing a function f with the following property: even though f can be approximated by polynomials in H(b), neither the Taylor partial sums of f nor their Ces\`aro, Abel, Borel or logarithmic means converge to f in H(b). A key tool is a new abstract result showing that, if one regular summability method includes another for scalar sequences, then it automatically does so for certain Banach-space-valued sequences too.
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