Estimates of uniform approximations by Zygmund sums on classes of convolutions of periodic functions
Abstract
We obtain order-exact estimates for uniform approximations by using Zygmund sums $Z^{s}_{n}$ of classes $C^{\psi}_{\beta,p}$ of $2\pi$-periodic continuous functions $f$ representable by convolutions of functions from unit balls of the
space $L_{p}$, $1< p<\infty$, with a fixed kernels $\Psi_{\beta}\in L_{p'}$, $\frac{1}{p}+\frac{1}{p'}=1$. In addition, we find a set of allowed values of parameters (that define the class $C^{\psi}_{\beta,p}$ and the linear method $Z^{s}_{n}$) for which Zygmund sums and Fejer sums realize the order of the best uniform approximations by trigonometric polynomials of those classes
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Published
2013-07-15
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Research papers
How to Cite
Estimates of uniform approximations by Zygmund sums on classes of convolutions of periodic functions. (2013). Transactions of Institute of Mathematics, the NAS of Ukraine, 10(1), 222-244. https://trim.imath.kiev.ua/index.php/trim/article/view/174