On a necessary condition for $L^p$ $(0 < p < 1)$-convergence (upper boundedness) of trigonometric series
https://doi.org/10.15330/cmp.7.1.83-90
Keywords:
trigonometric series, $L^{p}-$convergence, Hardy-Littlewood's inequality, Bernstein-Zygmund inequalities
Published online:
2015-07-03
Abstract
In this paper we prove that the condition $\sum_{k=\left[\frac{n}{2}\right] }^{2n}\frac{\lambda _{k}(p)}{(|n-k|+1)^{2-p}}=o(1)\, \left(=O(1) \right),$ is a necessary condition for the $L^{p} (0<p<1)$-convergence (upper boundedness) of a trigonometric series. Precisely, the results extend some results of A. S. Belov.
How to Cite
(1)
Krasniqi, X. On a Necessary Condition for $L^p$ $(0 < P < 1)$-Convergence (upper Boundedness) of Trigonometric Series. Carpathian Math. Publ. 2015, 7, 83-90.
