Order estimates of the uniform approximations by Zygmund sums on the classes of convolutions of periodic functions

Abstract

We establish the exact-order estimates of uniform approximations by the Zygmund sums Zsn-1 of 2π-periodic continuous functions f from the classes Cβ,p.These classes are defined by the convolutions of functions from the unit ball in the space Lp, 1≤ p<∞, with generating fixed kernels β(t)=Σk=1∞(k)(kt+βπ2), β∈ Lp', β∈ R, 1/p+1/p'=1. We additionally assume that the product (k)ks+1/p is generally monotonically increasing with the rate of some power function, and, besides, for 1< p<∞ it holds that Σk=n∞p'(k)kp'-2<∞, and for p=1 the following condition is true Σk=n∞(k)<∞.It is shown that under these conditions Zygmund sums Zsn-1 and Fejer sums σn-1=Z1n-1 realize the order of the best uniform approximations by trigonometric polynomials of these classes.