2019
DOI: 10.15330/cmp.11.2.321-334
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Approximation of the classes $W^{r}_{\beta,\infty}$ by three-harmonic Poisson integrals

Abstract: In the paper, we solve one extremal problem of the theory of approximation of functional classes by linear methods. Namely, questions are investigated concerning the approximation of classes of differentiable functions by $\lambda$-methods of summation for their Fourier series, that are defined by the set $\Lambda =\{{{\lambda }_{\delta }}(\cdot )\}$ of continuous on $\left[ 0,\infty \right)$ functions depending on a real parameter $\delta$. The Kolmogorov-Nikol'skii problem is considered, that is one of the s… Show more

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Cited by 12 publications
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“…From ( 27), taking into account ( 28) and ( 29 Similarly to [27] we can show that the following equality holds Thence…”
Section: Now We Show the Convergence Of The Integralmentioning
confidence: 97%
“…From ( 27), taking into account ( 28) and ( 29 Similarly to [27] we can show that the following equality holds Thence…”
Section: Now We Show the Convergence Of The Integralmentioning
confidence: 97%
“…It is known (see, e.g., [7,11]) that the values of approximation by the Poisson and biharmonic Poisson integrals cannot tend to zero at δ → ∞ faster than 1 δ and 1 δ 2 , respectively. At the same time, as follows from works [17][18][19], using the approximation by three-harmonic integrals, one can obtain the approximation rate 1 δ 3 , δ → ∞. Therefore, our purpose is to study the asymptotic behavior of the quantities E(C ψ β,∞ ; P 3,δ ) C at δ → ∞.…”
Section: Formulation Of the Problem And Some Historical Informationmentioning
confidence: 99%
“…The first results related to the study of the approximative properties of three-harmonic Poisson integrals were obtained in work [6]. Later, the research in this direction was continued in works [17][18][19]. In particular, the Kolmogorov-Nikolskii problem for the three-harmonic Poisson integral on the classes W r β,∞ , r > 0, β ∈ R, was solved in [17], and on the classes [18,19].…”
Section: Formulation Of the Problem And Some Historical Informationmentioning
confidence: 99%
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