Modulus of continuity and convergence of Fejér means of Vilenkin-Fourier series in the variable martingale Hardy space \(H_{p(\cdot)}\) (Q6611686)

This paper establishes the boundedness of the operator \(\sup_{k\in{\mathbb N}}\frac{|\sigma_{k}f|}{\log^{2}(k+1)}\) of Fejér means of the Vilenkin-Fouruer series from the Lebesgue space with variable exponents to the martingale Hardy space with variable exponents. This result provides sufficient conditions for the modulus of continuity which guarantees the convergence of Fejér means in the martingale Hardy space with variable exponents.\N\NFor the entire collection see [Zbl 1544.35009].