$L^p$--$L^q$ estimates for Shimorin-type integral operators

Abstract: Let $ν$ be a positive measure on $[0,1]$. A Shimorin-type operator $T_ν$ is an integral operator on the unit disk given by [ T_νf(z) = \int_{\mathbb{D}} \frac{1}{1 - z\overlineλ} \left( \int_0^1 \frac{dν(r)}{1 - r z \overlineλ} \right) f(λ) \, dA(λ), ] which originates from Shimorin's work on Bergman-type kernel representations for logarithmically subharmonic weighted Bergman spaces. In this paper, we study $L^p$--$L^q$ estimates for $T_ν$. Unlike classical Bergman-type operators, the critical line on the $(1/p,1/q)$-plane that separates the boundedness and unboundedness regions of $T_ν$ is not immediately evident. Moreover, even along this line, new phenomena arise. In the present work, by introducing a quantity $c_ν$, \begin{itemize} \item we first determine the critical boundary in the $(1/p,1/q)$-plane for bounded $T_ν$; \item furthermore, on this critical line, we establish necessary and sufficient conditions for $T_ν$ which have standard Bergman-type $L^p$--$L^q$ estimates, meaning that it is bounded in the interior of the region and admits weak-type and BMO-type estimates at endpoints. \end{itemize}