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Eurasian Mathematical Journal, 2015, Volume 6, Number 2, Pages 41–62
(Mi emj193)
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On estimates of the approximation numbers of the Hardy operator
E. N. Lomakinaab a Department of Higher Mathematics, Far Eastern State Transport University, 47 Seryshev St., Khabarovsk 680021, Russia
b Department of Mathematics and Mathematical Methods in Economics, Khabarovsk State University of Economics and Law,
134 Tikhookeanskaya St., Khabarovsk 680042, Russia
Abstract:
We obtain two–sided estimates which describe the behaviour of the approximation numbers of the Hardy operator and Schatten–Neumann norms in the new case, when the compact operator
$$
Tf(x)=\int_0^x f(\tau) d\tau, \quad x>0,
$$
is acting from a Lebesgue space to a Lorentz space $(T: L_v^r(R^+)\to L_\omega^{pq}(R^+))$ under the
condition $1<p<r\leqslant q<\infty$.
Keywords and phrases:
Lebesgue space, Lorentz space, Hardy operator, approximation numbers, Schatten–von Neumann norm.
Received: 14.04.2015
Citation:
E. N. Lomakina, “On estimates of the approximation numbers of the Hardy operator”, Eurasian Math. J., 6:2 (2015), 41–62
Linking options:
https://www.mathnet.ru/eng/emj193 https://www.mathnet.ru/eng/emj/v6/i2/p41
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Abstract page: | 205 | Full-text PDF : | 94 | References: | 52 |
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