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Eurasian Mathematical Journal, 2012, том 3, номер 4, страницы 44–52
(Mi emj104)
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Эта публикация цитируется в 5 научных статьях (всего в 5 статьях)
Orthogonality and smooth points in $C(K)$ and $C_b(\Omega)$
D. J. Kečkić Faculty of Mathematics, University of Belgrade, Beograd
Аннотация:
For the usual norm on spaces $C(K)$ and $C_b(\Omega)$ of all continuous functions on a compact Hausdorff space $K$ (all bounded continuous functions on a locally compact Hausdorff space $\Omega$), the following equalities are proved:
$$
\lim_{t\to0+}\frac{\|f+tg\|_{C(K)}-\|f\|_{C(K)}}t=\max_{x\in\{z\mid\,|f(z)|=\|f\|\}}\operatorname{Re}(e^{-i\arg f(x)}g(x))
$$
and
$$
\lim_{t\to0+}\frac{\|f+tg\|_{C_b(\Omega)}-\|f\|_{C_b(\Omega)}}t=\inf_{\delta>0}\sup_{x\in\{z\mid\,|f(z)|\ge\|f\|-\delta\}}\operatorname{Re}(e^{-i\arg f(x)}g(x)).
$$
These equalities are used to characterize the orthogonality in the sense of James (Birkhoff) in spaces $C(K)$ and $C_b(\Omega)$ as well as to give necessary and sufficient conditions for a point on the unit sphere to be a smooth point.
Ключевые слова и фразы:
orthogonality in the sense of James, Gateaux derivative, smooth points.
Поступила в редакцию: 22.11.2011
Образец цитирования:
D. J. Kečkić, “Orthogonality and smooth points in $C(K)$ and $C_b(\Omega)$”, Eurasian Math. J., 3:4 (2012), 44–52
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/emj104 https://www.mathnet.ru/rus/emj/v3/i4/p44
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