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 Model. Anal. Inform. Sist.: Year: Volume: Issue: Page: Find

 Model. Anal. Inform. Sist., 2015, Volume 22, Number 1, Pages 127–143 (Mi mais425)

On the approximation of periodic functions in $L_2$ and the values of the widths of certain classes of functions

K. Tukhliev

Khujand State University, Mavlonbekova, 1, Khujand, 735700, Tajikistan

Abstract: The sharp Jackson–Stechkin inequalities are received, in which a special module of continuity $\widetilde{\Omega}_{m}(f; t)$ determined by Steklov's function is used instead the usual modulus of continuity of $m$th order $\omega_{m}(f; t)$. Such generalized modulus of continuity of $m$th order were introduced by V. A. Abilov and F. V. Abilova. The introduced modulus of continuity found their application in the theory of polynomial approximation in Hilbert space in the works by M. Sh. Shabozov and G. A. Yusupov, S. B. Vakarchuk and V. I. Zabutnaya and others.
While continuing and developing these direction for some classes of functions defined by modulus of continuity, the new values of $n$-widths in the Hilbert space $L_{2}$ were found.

Keywords: best polynomial approximation, Steklov operator, modulus of continuity, generalized modulus of continuity, $n$-widths.

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Bibliographic databases:
UDC: 517.5

Citation: K. Tukhliev, “On the approximation of periodic functions in $L_2$ and the values of the widths of certain classes of functions”, Model. Anal. Inform. Sist., 22:1 (2015), 127–143

Citation in format AMSBIB
\Bibitem{Tuk15}
\by K.~Tukhliev
\paper On the approximation of periodic functions in $L_2$ and the values of the widths of certain classes of functions
\jour Model. Anal. Inform. Sist.
\yr 2015
\vol 22
\issue 1
\pages 127--143
\mathnet{http://mi.mathnet.ru/mais425}
\mathscinet{http://www.ams.org/mathscinet-getitem?mr=3417817}
\elib{https://elibrary.ru/item.asp?id=23237975}