INTERPOLATING BLASCHKE PRODUCTS AND ANGULAR DERIVATIVES


Autoria(s): Gallardo-Gutierrez, Eva A.; Gorkin, Pamela
Data(s)

01/01/2012

Resumo

We show that to each inner function, there corresponds at least one interpolating Blaschke product whose angular derivatives have precisely the same behavior as the given inner function. We characterize the Blaschke products invertible in the closed algebra H-infinity[(b) over bar : b has finite angular derivative everywhere. We study the most well-known example of a Blaschke product with infinite angular derivative everywhere and show that it is an interpolating Blaschke product. We conclude the paper with a method for constructing thin Blaschke products with infinite angular derivative everywhere.

Formato

application/pdf

Identificador

http://digitalcommons.bucknell.edu/fac_journ/293

http://digitalcommons.bucknell.edu/cgi/viewcontent.cgi?article=1125&context=fac_journ

Publicador

Bucknell Digital Commons

Fonte

Faculty Journal Articles

Palavras-Chave #Blaschke product #interpolating Blaschke product #angular derivative #Mathematics
Tipo

text