Maximal Blaschke products |
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Authors: | Daniela Kraus Oliver Roth |
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Institution: | Department of Mathematics, University of Würzburg, 97074 Würzburg, Germany |
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Abstract: | We consider the classical problem of maximizing the derivative at a fixed point over the set of all bounded analytic functions in the unit disk with prescribed critical points. We show that the extremal function is essentially unique and always an indestructible Blaschke product. This result extends the Nehari–Schwarz Lemma and leads to a new class of Blaschke products called maximal Blaschke products. We establish a number of properties of maximal Blaschke products, which indicate that maximal Blaschke products constitute an appropriate infinite generalization of the class of finite Blaschke products. |
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Keywords: | 30H05 30J10 35J60 30H20 30F45 53A30 |
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