Abstract:
A solution is given to Stechkin's problem on the best approximation on the real axis of differentiation operators of fractional (more precisely, real) order $k$ in the space $L_2$ by bounded linear operators from the space $L$ to the space $L_2$ on the class of functions whose fractional derivative of order $n$, $0\le k<n,$ is bounded in the space $L_2$. An upper estimate is obtained for the best constant in the corresponding Kolmogorov inequality. It is shown that the well-known Stechkin lower estimate for the value of the problem of approximating the differentiation operator via the best constant in the Kolmogorov inequality is strict in this case; in other words, Stechkin's problem and the Kolmogorov inequality are not consistent.
Citation:
V. V. Arestov, “A variant of Stechkin's problem on the best approximation of a fractional order differentiation operator on the axis”, Trudy Inst. Mat. i Mekh. UrO RAN, 30, no. 4, 2024, 37–54
\Bibitem{Are24}
\by V.~V.~Arestov
\paper A variant of Stechkin's problem on the best approximation of a fractional order differentiation operator on the axis
\serial Trudy Inst. Mat. i Mekh. UrO RAN
\yr 2024
\vol 30
\issue 4
\pages 37--54
\mathnet{http://mi.mathnet.ru/timm2126}
\crossref{https://doi.org/10.21538/0134-4889-2024-30-4-37-54}
\elib{https://elibrary.ru/item.asp?id=75134204}
\edn{https://elibrary.ru/mbodhh}
Citation in format AMSBIB
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