Abstract:
A theorem is established, asserting that the norm of the derivative $f^{(n)}(z)$ in the space $H^2$ for a function $f(z)$ regular in the disc is not increased if we replace $f$ by the ratio $f(z)/G(z)$, where $G(z)$ is any interior function dividing $f(z)$ whose singular part is of a particular form.
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