Absolute convergence of Walsh-Fourier series and related results (Q653816)

Consider the Walsh orthonormal system on \([0,1)\) with respect to the Paley enumeration, and the Walsh Fourier coefficients \(\widehat{f}(n)\) of a function \(f\in L^p\) for some \(1<p\leq2\). The author finds best possible sufficient conditions for the finiteness of the series \(\sum_{n=1}^\infty a_n| \widehat{f}(n)| ^r\), where \(a_n\) is a given sequence of nonnegative real numbers satisfying a mild assumption and \(0 < r < 2\). These sufficient conditions are in terms of (either global or local) dyadic moduli of continuity of \(f\).