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00925njm 22002777a 4500 dc Cascante, Carme author Fàbrega, Joan author Pascuas, Daniel author Peláez-Márquez, José Ángel author 2024-09 In [1] it is shown that the Bloch space in the unit disc has the following radicality property: if an analytic function g satisfies that , then , for all . Since coincides with the space of analytic symbols g such that the Volterra-type operator is bounded on the classical weighted Bergman space , the radicality property was used to study the composition of paraproducts and on . Motivated by this fact, we prove that also has the radicality property, for any radial weight ω. Unlike the classical case, the lack of a precise description of for a general radial weight, induces us to prove the radicality property for from precise norm-operator results for compositions of analytic paraproducts. Carme Cascante, Joan Fàbrega, Daniel Pascuas, José Ángel Peláez, On the radicality property for spaces of symbols of bounded Volterra operators, Journal of Functional Analysis, Volume 287, Issue 12, 2024, 110658, ISSN 0022-1236 https://hdl.handle.net/10630/32529 10.1016/j.jfa.2024.110658 Volterra, Operadores Matemáticas Informática Análisis (Matemáticas) On the radicality property for spaces of symbols of bounded Volterra operators