Analytic continuability of Bergman inner functions (Q1371335)

Let \( 0 <p < \infty\) be fixed, \(D:= \{ z \in\mathbb{C}: |z|<1\}\), and consider the Bergman space of those functions in \(L^p(D)\) which are analytic on \(D\). If \((\alpha_n)\) is the sequence of zeros, repeated according to the multiplicity, of a non trivial Bergman function, then there exists a unique function \(\varphi\), extremal in a certain sense, that vanishes at each point of the sequence to exactly the prescribed multiplicity. This \(\varphi\) is called a Bergman inner function. The main objective of this paper is to prove that \(\varphi\) has an analytic continuation to a neighborhood of any \(z_0\in\mathbb{C}\), \(|z_0|=1\), that is not a limit point of \((\alpha_n)\).