Compactness of the difference of weighted composition operators between weighted \(l^p\) spaces
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Juan D. Cardona-Gutierrez
jdcardona@math.cinvestav.edu.mx
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Julio C. Ramos-Fernández
jcramosf@udistrital.edu.co
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Harold Vacca-González
hvacca@udistrital.edu.co
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DOI:
https://doi.org/10.56754/0719-0646.2701.119Abstract
This paper investigates the properties of weighted composition operators acting between different weighted \(l^p\) spaces. Inspired by recent advancements in the field, we explore criteria for the continuity and compactness of these operators. Specifically, we provide simple conditions, in terms of normalized canonical sequences, for the continuity and compactness of the difference between two weighted composition operators, \( W_{\varphi,u} \) and \(W_{\psi,v}\). Furthermore, we calculate the essential norm of these operators. Our results extend and generalize previous works, offering new insights into the behavior of weighted composition operators in Banach sequence spaces. The findings contribute to the understanding of these operators' topological properties, particularly their applications in sequence spaces and functional analysis.
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