Blaschke products and their applications
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Bibliographic Information
Blaschke products and their applications
(Fields Institute communications, v. 65)
Fields Institute for Research in Mathematical Sciences , Springer, c2013
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
C-P||Toronto||2011.6200026167975
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"With the exclusive help of Fields Institute, we held a conference on Blaschke Products and Application from July 25 to 29, 2011, at the University of Toronto."--Pref
Includes bibliographical reference
Description and Table of Contents
Description
Blaschke Products and Their Applications presents a collection of survey articles that examine Blaschke products and several of its applications to fields such as approximation theory, differential equations, dynamical systems, harmonic analysis, to name a few. Additionally, this volume illustrates the historical roots of Blaschke products and highlights key research on this topic. For nearly a century, Blaschke products have been researched. Their boundary behaviour, the asymptomatic growth of various integral means and their derivatives, their applications within several branches of mathematics, and their membership in different function spaces and their dynamics, are a few examples of where Blaschke products have shown to be important. The contributions written by experts from various fields of mathematical research will engage graduate students and researches alike, bringing the reader to the forefront of research in the topic. The readers will also discover the various open problems, enabling them to better pursue their own research.
Table of Contents
-Preface. - Applications of Blaschke products to the spectral
theory of Toeplitz operators (Grudsky, Shargorodsky). -A
survey on Blaschke-oscillatory differential equations, with updates (Heittokangas.). - Bi-orthogonal expansions in the space L2(0,1) ( Boivin, Zhu). - Blaschke
products as solutions of a functional equation (Mashreghi.). - Cauchy
Transforms and Univalent Functions( Cima,
Pfaltzgraff). - Critical points, the Gauss curvature equation and
Blaschke products (Kraus, Roth). - Growth, zero distribution and factorization
of analytic functions of moderate growth in the unit disc, (Chyzhykov, Skaskiv).
- Hardy means of a finite Blaschke product and its derivative ( Gluchoff, Hartmann).
-Hyperbolic derivatives determine a function uniquely (Baribeau). - Hyperbolic wavelets and multiresolution in the Hardy
space of the upper half plane (Feichtinger, Pap). - Norm
of composition operators induced by finite Blaschke products on Mobius
invariant spaces (Martin, Vukotic). - On
the computable theory of bounded analytic functions (McNicholl). - Polynomials versus finite Blaschke products (
Tuen Wai Ng, Yin Tsang). -Recent progress on truncated Toeplitz operators (Garcia,
Ross).
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