Optimal uniform and tangential approximation in an angle by meromorphic functions (Q2514381)

The problem of uniform and tangential approximation in the angle \(\Delta_\alpha=\{\zeta\in\mathbb{C}:|\arg \zeta|\leq\alpha/2\}\) by meromorphic functions with optimal growth is studied. For uniform approximation, it is supposed that the approximable function \(f\) belongs to \( A'(\Delta_\alpha)\). In this case, the growth of the approximating functions depends on the growth of \(f\) in \(\Delta_\alpha\) and on the growth of \(f'\) on \(\partial\Delta_\alpha\). In the case of tangential approximation, the growth of the approximating meromorphic functions also depends on the speed of the approximation.