Infinite dimension of solutions of the Dirichlet problem (Q317663)

Let \(u_n(z)=\Re \frac{\zeta_n+z}{\zeta_n-z}\), \(\zeta_n=e^{i\theta_n}\), \(\theta_n=\pi(1-2^{-n})\), \(n\in \mathbb{N}\). It is proved that the metrizable space of all harmonic functions of the form \(u=\sum_n \gamma_n u_n\), where \((\gamma_n)\in l^1\), with locally uniform convergence in the unit disk, has infinite dimension.NEWLINENEWLINEIn particular, the space of all harmonic functions in the unit disk with nontangential limit \(0\) almost everywhere on the unit circle is infinite-dimensional as well.