Weak-Lp bounds for the Carleson and Walsh-Carleson operators
Abstract
We prove a weak-Lp bound for the Walsh-Carleson operator for p near 1, improving on a theorem of Sjolin. We relate our result to the conjectures that the Walsh-Fourier and Fourier series of a function f∈ L L( T) converge for almost every x ∈ T.
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