Quasiconformal extension of meromorphic functions with nonzero pole

Abstract

In this note, we consider meromorphic univalent functions f(z) in the unit disc with a simple pole at z=p∈(0,1) which have a k-quasiconformal extension to the extended complex plane C, where 0≤ k < 1. We denote the class of such functions by k(p). We first prove an area theorem for functions in this class. Next, we derive a sufficient condition for meromorphic functions in the unit disc with a simple pole at z=p∈(0,1) to belong to the class k(p). Finally, we give a convolution property for functions in the class k(p).