Karagulyan, Grigori A. On exceptional sets of the Hilbert transform. (English) Zbl 1393.42008 Real Anal. Exch. 42, No. 2, 311-328 (2017). The author continues his study of exceptional sets for classical operators. In his previous works the results were obtained for operators satisfying the localization property. In the study of the Hilbert transform in the paper under review, the earlier elaborated approach does not work, since the Hilbert transform does not possess the localization property. It is proved that any null set is an exceptional set for the Hilbert transform of an indicator function. The paper also contains a real variable proof of the main lemma in the Kahane-Katznelson’s work on divergence of Fourier series as a consequence of the author’s general lemma. Reviewer: Elijah Liflyand (Ramat-Gan) MSC: 42A50 Conjugate functions, conjugate series, singular integrals 42A20 Convergence and absolute convergence of Fourier and trigonometric series Keywords:Hilbert transform; exceptional null set; divergent Fourier series; indicator function PDFBibTeX XMLCite \textit{G. A. Karagulyan}, Real Anal. Exch. 42, No. 2, 311--328 (2017; Zbl 1393.42008) Full Text: DOI arXiv Euclid