On the properties of a singular integral with a logarithmically weakened Hilbert kernel (Q2386963)

The author provides an upper estimate of the function \(s\), or of its difference \(\omega(s,h):=s(\cdot+h)-s(\cdot)\), where \[ s(t)=(Bx)(t):= \frac1{2\pi}\int_0^{2\pi}x(\tau)\,\cot \frac{\tau-t}2\,\ln^{-m} \Big(\frac c{| \sin\frac{\tau-t}2| }\Big)\,dt \] (\(x\) is a continuous \(2\pi\)-periodic function and \(c>\pi/2\) is a suitable constant), in terms of \(x\), or of \(x\) and \(h\), respectively.