Almost everywhere convergence of Fej\'er means of two-dimensional triangular Walsh-Fourier series
Abstract
In 1987 Harris proved (Proc. Amer. Math. Soc., 101) - among others- that for each 1 p<2 there exists a two-dimensional function f∈ Lp such that its triangular Walsh-Fourier series diverges almost everywhere. In this paper we investigate the Fej\'er (or (C,1)) means of the triangle two variable Walsh-Fourier series of L1 functions. Namely, we prove the a.e. convergence σnf = 1nΣk=0n-1Sk, n-kf f (n∞) for each integrable two-variable function f.
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