A peaking and interpolation problem for univalent functions

For 0p -1, let S denote the class of functions f z meromorphic univalent p Ž . Ž . Ž . in the unit disk ‫ބ‬ with the normalization f 0 s 0, f Ј 0 s 1, and f p s ϱ. Let Ž . S a be the subclass of S with the fixed residue a. In this note we determine the p p Ž . extreme points of the class S a . As a

We characterize the interpolating sequences for the Bernstein space of entire functions of exponential type, in terms of a Beurling-type density condition and a Carleson-type separation condition. Our work extends a description previously given by Beurling in the case that the interpolating sequence

In this paper we introduce a class of functions analytic in a half disk and for which the Nevanlinna-Pick interpolation problem has a solution in terms of a linear fractional transformation. The method used to solve this problem is that of the fundamental matrix inequality, suitably adapted to the p