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The Existence of Universal Inner Functions on the Unit Ball of $\mathbb{C}^n$

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http://dx.doi.org/10.4153/CMB-2005-038-4
Canad. Math. Bull. 48(2005), 409-413

Published:2005-09-01
Printed: Sep 2005

Canadian Mathematical Bulletin

P. M. Gauthier
J. Xiao

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Abstract

It is shown that there exists an inner function $I$ defined on the unit ball ${\bf B}^n$ of ${\mathbb C}^n$ such that each function holomorphic on ${\bf B}^n$ and bounded by $1$ can be approximated by ``non-Euclidean translates" of $I$.

Keywords:

universal inner functions universal inner functions

MSC Classifications:

32A35, 30D50, 47B38 show english descriptions $H^p$-spaces, Nevanlinna spaces [See also 32M15, 42B30, 43A85, 46J15]
Blaschke products, bounded mean oscillation, bounded characteristic, bounded functions, functions with positive real part
Operators on function spaces (general) 32A35 - $H^p$-spaces, Nevanlinna spaces [See also 32M15, 42B30, 43A85, 46J15]
30D50 - Blaschke products, bounded mean oscillation, bounded characteristic, bounded functions, functions with positive real part
47B38 - Operators on function spaces (general)

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