Growth estimates for generalized factors of spaces
Joseph A. Cima; Angeliki Kazas; Michael I. Stessin
Studia Mathematica (2003)
- Volume: 158, Issue: 1, page 19-38
- ISSN: 0039-3223
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topJoseph A. Cima, Angeliki Kazas, and Michael I. Stessin. "Growth estimates for generalized factors of $H^{p}$ spaces." Studia Mathematica 158.1 (2003): 19-38. <http://eudml.org/doc/284660>.
@article{JosephA2003,
abstract = {With φ an inner function and $M_\{φ\}$ the multiplication operator on a given Hardy space it is known that for any given function f in the Hardy space we may use the Wold decomposition to obtain a factorization of the given f (not the Riesz factorization). This new factorization has been shown to be useful in the study of commutants of Toeplitz operators.
We study the smoothness of each factor of this factorization. We show in some cases that the factors lie in the same Hardy space (or smoothness class) as the given function f. We also construct an example to show that there are bounded, holomorphic functions which have factors that are not in a given Hardy p-space. Many of our results are produced by studying a natural class of positive measures associated to the given inner function.},
author = {Joseph A. Cima, Angeliki Kazas, Michael I. Stessin},
journal = {Studia Mathematica},
keywords = {Hardy space; Riesz factorization; Clark measures},
language = {eng},
number = {1},
pages = {19-38},
title = {Growth estimates for generalized factors of $H^\{p\}$ spaces},
url = {http://eudml.org/doc/284660},
volume = {158},
year = {2003},
}
TY - JOUR
AU - Joseph A. Cima
AU - Angeliki Kazas
AU - Michael I. Stessin
TI - Growth estimates for generalized factors of $H^{p}$ spaces
JO - Studia Mathematica
PY - 2003
VL - 158
IS - 1
SP - 19
EP - 38
AB - With φ an inner function and $M_{φ}$ the multiplication operator on a given Hardy space it is known that for any given function f in the Hardy space we may use the Wold decomposition to obtain a factorization of the given f (not the Riesz factorization). This new factorization has been shown to be useful in the study of commutants of Toeplitz operators.
We study the smoothness of each factor of this factorization. We show in some cases that the factors lie in the same Hardy space (or smoothness class) as the given function f. We also construct an example to show that there are bounded, holomorphic functions which have factors that are not in a given Hardy p-space. Many of our results are produced by studying a natural class of positive measures associated to the given inner function.
LA - eng
KW - Hardy space; Riesz factorization; Clark measures
UR - http://eudml.org/doc/284660
ER -
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