A non-removable set for analytic functions satisfying a Zygmund condition (Q1064433)

An example is given of a compact plane set E of zero area and a probability measure \(\mu\) on E such that the Cauchy transform \({\hat \mu}\)(z)\(=\int d\mu (\zeta)/(\zeta -z)\) belongs to the Zygmund class, i.e. such that there exists a constant C such that \[ | {\hat \mu}(z+h)+{\hat \mu}(z-h)-2{\hat \mu}(z)| \leq C| h| \quad for\quad all\quad z,h\in {\mathbb{C}}. \] This shows that there exist compact sets of zero area which are non-removable singularity sets for the space of analytic functions satisfying a Zygmund condition. (It is well known that for a set to be removable for this space it is necessary that it has zero area.)