Finite harmonic and geometric interpolation (Q792503)

In previous works, the authors have considered the problem of expressing the value of a real-valued harmonic function u in the unit disc as a finite weighted mean \[ u(z)=1/N\sum^{N}_{k=1}\frac{R^ 2-| z|^ 2}{| \xi_ k-z|^ 2}u(\xi_ k), \] for \(| z|<R<1\), and \(\xi_ 1,\xi_ 2,...,\xi_ N\) points equally spaced on \(| z| =R\). In the present work, they consider the analogous problem in domains other than the disc. Of course, the role of the Poisson kernel is played by the normal derivative of the Green function. As an application, they also give a uniqueness theorem for bounded holomorphic functions.