Order estimation of the best approximations and of the approximations by Fourier sums of classes of (,β)--diferentiable functions

Abstract

There were established the exact-order estimations of the best uniform approximations by the trigonometrical polynoms on the Cβ,p classes of 2π-periodic continuous functions f, which are defined by the convolutions of the functions, which belong to the unit ball in Lp, 1≤ p <∞ spaces with generating fixed kernels β⊂|Lp', 1p+1p'=1, whose Fourier coeficients decreasing to zero approximately as power functions. The exact order estimations were also established in Lp-metrics, 1 < p ≤∞ for Lβ,1 classes of 2π-periodic functions f, which are equivalent by means of Lebesque measure to the convolutions of β⊂|Lp kernels with the functions that belong to the unit ball in L1 space. We showed that in investigating cases the orders of best approximations are realized by Fourier sums.