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This article is cited in 10 scientific papers (total in 11 papers)
Extremal functional interpolation in the mean with least value of the $n$-th derivative for large averaging intervals
Yu. N. Subbotin Institute of Mathematics and Mechanics, Ural Branch of the Russian Academy of Sciences
Abstract:
The smallest number $A<\infty$ is found such that for any sequence
$Y=\{y_k,k\in\mathbb Z\}$ with $|\Delta^ny_k|\le1$ there exists a $u(t)$, $|u(t)|\le A$, for which the equation
$y^n(t)=u(t)$ ($-\infty<t<\infty$) has a solution satisfying the conditions
$$
y_k=\frac 1h\int_{-h/2}^{h/2}y(k+1)\,dt,
$$
where $k\in\mathbb Z$, $1<h<2$.
A similar problem is treated in $L_p(-\infty,\infty)$. It is shown that for $h=2m$ ($m$ a natural number) no such finite $A$ exists.
Received: 19.01.1994
Citation:
Yu. N. Subbotin, “Extremal functional interpolation in the mean with least value of the $n$-th derivative for large averaging intervals”, Mat. Zametki, 59:1 (1996), 114–132; Math. Notes, 59:1 (1996), 83–96
Linking options:
https://www.mathnet.ru/eng/mzm1699https://doi.org/10.4213/mzm1699 https://www.mathnet.ru/eng/mzm/v59/i1/p114
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