Strong summability of Fourier transforms at Lebesgue points and Wiener amalgam spaces (Q886934)

Summary: We characterize the set of functions for which strong summability holds at each Lebesgue point. More exactly, if \(f\) is in the Wiener amalgam space \(W(L_1,\ell_q)(\mathbb{R})\) and \(f\) is almost everywhere locally bounded, or \(f\in W(L_p,\ell_q)(\mathbb{R})\) (\(1<p<\infty,1\leq q<\infty)\), then strong \(\theta\)-summability holds at each Lebesgue point of \(f\). The analogous results are given for Fourier series, too.