Vilenkin-Fourier series in variable Lebesgue spaces
Abstract
Let Snf denote the nth partial sum of the Vilenkin-Fourier series of a function f ∈ L1(G). For 1 < p- ≤ p+ < ∞, we characterize all exponents p(·) for which the convergence of Snf to f in Lp(·)(G) holds whenever f ∈ Lp(·)(G).
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