Integrability of the monotone majorant of the sum of a trigonometric series with quasiconvex coefficients (Q1812669)

The sine and cosine Fourier series on \([0,\pi]\) are considered for which the coefficients converge to 0 and form a quasiconvex sequence. Such series converge on \((0,\pi]\). A. N. Kolmogorov established the absolute integrability of the cosine series on \([0,\pi]\) and the author of the paper previously found a necessary and sufficient condition for the sine series to be absolutely integrable. In the present paper the author considers the least monotone majorants of such sine and cosine series. He shows that the majorant for the cosine series is automatically integrable while for the sine series the majorant is integrable if and only if the series itself is integrable.