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Denoting by $bD'_\\beta$ the boundary of $D'_\\beta$, it is classical that $H^2(D'_\\beta)$ can be identified with the closed subspace of $L^2(bD'_\\beta,d\\sigma)$, denoted by $H^2(bD'_\\beta)$, consisting of the boundary values of functions in $H^2(D'_\\beta)$, where $d\\sigma$ is the induced Lebesgue measure. The orthogonal Hilbert space projection $P: L^2(D'_\\beta,d\\sigma)\\to H^2(bD'_\\beta)$ is c","authors_text":"Alessandro Monguzzi, Marco M. 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