Order estimates of the best orthogonal trigonometric approximations of classes of convolutions of periodic functions of not high smoothness

Abstract

We obtain order estimates for the best uniform orthogonal trigonometric approximations of 2π-periodic functions, whose (,β)-derivatives belong to unit balls of spaces Lp, \ 1≤ p<∞, in case at consequences (k) are that product (n)n1p can tend to zero slower than any power function and Σk=1∞p'(k)kp'-2<∞ when 1<p<∞, 1p+1p'=1 and Σk=1∞(k)<∞ when p=1. We also establish the analogical estimates in Ls-metric, 1< s≤ ∞, for classes of the summable (,β)-differentiable functions, such that fβ1≤1.