| Summary: | Blaschke products have been researched for nearly a century. They have�shown to be important in several branches of mathematics through their� boundary behaviour, dynamics, membership in different function spaces,� and the asymptotic growth of various integral means of their derivatives. � This volume presents a collection of survey and research articles that�examine Blaschke products and several of their applications to fields� such as approximation theory, differential equations, dynamical� systems, and harmonic analysis. Additionally, it illustrates the� historical roots of Blaschke products and highlights key research on this topic. � The contributions, written by experts from various fields of� mathematical research, include several open problems. They will� engage graduate students and researchers alike, bringing them to the�forefront of research in the subject.
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