Abstract
In the present work, we are interested in compact integration operators \(I_g f(z) = \int _0^z f(\zeta )g'(\zeta )d\zeta \) acting on the Hardy space \(H^2\) and on the weighted Bergman spaces \({{\mathcal {A}}}^2_\alpha \). We give upper and lower estimates for the singular values of \(I_g\).
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