On the radicality property for spaces of symbols of bounded Volterra operators
C. Cascante, J. Fábrega, D. Pascuas, J. A. Peláez
Abstract
In a recent paper of the authors together with A. Aleman, it is shown that the Bloch space $\mathcal{B}$ in the unit disc has the following radicality property: if an analytic function $g$ satisfies that $g^n\in \mathcal{B}$, then $g^m\in \mathcal{B}$, for all $m\le n$. Since $\mathcal{B}$ coincides with the space $\mathcal{T}(A^p_α)$ of analytic symbols $g$ such that the Volterra-type operator $T_gf(z)= \int_0^z f(ζ)g'(ζ)\,dζ$ is bounded on the classical weighted Bergman space $A^p_α$, the radicality property was used to study the composition of paraproducts $T_g$ and $S_gf=T_fg$ on $A^p_α$. Motivated by this fact, we prove that $\mathcal{T}(A^p_ω)$ also has the radicality property, for any radial weight $ω$. Unlike the classical case, the lack of a precise description of $\mathcal{T}(A^p_ω)$ for a general radial weight, induces us to prove the radicality property for $A^p_ω$ from precise norm-operator results for compositions of analytic paraproducts.