On a generalization of the Leindler-Meir and Stečkin results (Q1976025)

The author generalizes a theorem of Leindler-Meir which is a generalization to strong approximation of an interesting theorem of Stechkin regarding natural approximation by de la Vallée-Poussin means. In the present paper the following strong means \[ \Biggl\{{1\over m+1} \sum^m_{k= n-m} t_k|s_k(x)- f(x)|^p\Biggr\}^{1/p},\quad p\geq 1, \] where \(\{t_k\}\) is a nonincreasing sequence of nonnegative numbers, are estimated by the best trigonometric approximation \(E_n\) of \(f\in C_{2\pi}\).