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Zapiski Nauchnykh Seminarov LOMI, 1991, Volume 190, Pages 81–100
(Mi znsl4891)
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This article is cited in 27 scientific papers (total in 27 papers)
Entire functions of exponential type and model subspaces in $H^p$
K. M. Dyakonov
Abstract:
Let $W_\sigma^p$ denote the space of all entire functions $f$ (in
$\mathbb{C}$) of exponential type $\leqslant\sigma$, whose restrictions $f\mid\mathbb{R}$ belong
to $L^p(\mathbb{R})$. For an inner function $\theta$ in the upper halfplane $\mathbb{C}_+$
let $K_\theta^p$ ($p\geqslant1$) be the star invariant subspace (or the model
subspace) of $H^p$ generated by $\theta$: $K_\theta^p\stackrel{def}=H^p\cap\theta\overline{H^p}$, where
$H^p=H^p(\mathbb{C}_+)$ is the usual Hardy class.
It is shown that many well-known properties of the spaces
$W_\sigma^p$ (e.g. some imbedding and uniqueness theorems, the Logvinenko–Sereda theorem
about equivalent norms, the S. N. Bernstein differential
inequality) hold for $K_\theta^p$ if and only if the derivative
$\theta'$ is bounded. The classical results on entire functions are
obtained by setting $\theta(x)=\exp(i\sigma x)$.
Citation:
K. M. Dyakonov, “Entire functions of exponential type and model subspaces in $H^p$”, Investigations on linear operators and function theory. Part 19, Zap. Nauchn. Sem. LOMI, 190, Nauka, St. Petersburg, 1991, 81–100; J. Math. Sci., 71:1 (1994), 2222–2233
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https://www.mathnet.ru/eng/znsl4891 https://www.mathnet.ru/eng/znsl/v190/p81
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Abstract page: | 280 | Full-text PDF : | 133 |
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