Almost Everywhere Convergence of Arithmetic Means of Walsh--Fourier Partial Sums Along Subsequences
Abstract
Let Sm f denote the m-th partial sum of the Walsh-Fourier series of f ∈ L1. For an increasing sequence a=(a(n))n ≥ 1 of positive integers, consider the arithmetic means σN f:=1N Σn=1N Sa(n) f . G\'at proved in 2019 that σN f → f almost everywhere for every f ∈ L1 under the growth condition a(n+1) ≥(1+1nδ) a(n), 0<δ<12 . We show that the same conclusion remains valid throughout the full range 0<δ<1.
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