Cesàro summability of Walsh-Fourier series on Hardy spaces and Herz spaces over the \(p\)-series fields (Q2719906)

It is proved that the maximal operator of the Fejér means of a one-dimensional Walsh- (or Vilenkin-) Fourier series on the \(p\)-series is bounded from the Hardy-Lorentz space \(H_{p,q}\) to \(L_{p,q}\) \((1/2< p< \infty)\) and is of weak type \((L_1, L_1)\). It is obtained that the Fejér means of a function \(f\in L_1\) converge a.e. to \(f\). The same is proved for two-dimensional functions if the supremum in the maximal operator is taken over a positive cone. Note that these results are also proved in [\textit{F. Weisz}, ``Hardy spaces and Cesàro means of two-dimensional Fourier series'', Bolyai Soc. Math. Stud. 5, 353-367 (1996; Zbl 0866.42019)]. The boundedness of the maximal Fejér operator of one-dimensional functions on Herz spaces is also verified.