RT Journal Article
T1 Words of analytic paraproducts on Hardy and weighted Bergman spaces.
A1 Aleman, Alexandru
A1 Casante, Carme
A1 Fàbrega, Joan
A1 Pascuas, Daniel
A1 Peláez-Márquez, José Ángel
K1 Hilbert, Espacio de
K1 Hardy, Espacios de
AB For a fixed analytic function g on the unit disc, we consider the analytic paraproducts induced by g, which are formally defined by , , and . We are concerned with the study of the boundedness of operators in the algebra generated by the above operators acting on Hardy, or standard weighted Bergman spaces on the disc. The general question is certainly very challenging, since operators in are finite linear combinations of finite products (words) of which may involve a large amount of cancellations to be understood. The results in [1] show that boundedness of operators in a fairly large subclass of can be characterized by one of the conditions , or belongs to or the Bloch space, for some integer . However, it is also proved that there are many operators, even single words in whose boundedness cannot be described in terms of these conditions. The present paper provides a considerable progress in this direction. Our main result provides a complete quantitative characterization of the boundedness of an arbitrary word in in terms of a “fractional power” of the symbol g, that only depends on the number of appearances of each of the letters in the given word.
PB Elsevier
YR 2024
FD 2024
LK https://hdl.handle.net/10630/31613
UL https://hdl.handle.net/10630/31613
LA eng
NO Alexandru Aleman, Carme Cascante, Joan Fàbrega, Daniel Pascuas, José Ángel Peláez, Words of analytic paraproducts on Hardy and weighted Bergman spaces, Journal de Mathématiques Pures et Appliquées, Volume 188, 2024, Pages 179-214, ISSN 0021-7824
NO Funding for open access charge: Universidad de Málaga / CBUA
DS RIUMA. Repositorio Institucional de la Universidad de Málaga
RD 21 ene 2026