Criteria for univalence, Integral means and Dirichlet integral for Meromorphic functions

Abstract

Let A(p) be the class consisting of functions f that are holomorphic in \p\, p∈ (0,1) possessing a simple pole at the point z=p with nonzero residue and normalized by the condition f(0)=0=f'(0)-1. In this article, we first prove a sufficient condition for univalency for functions in A(p). Thereafter, we consider the class denoted by (p) that consists of functions f ∈ A(p) that are univalent in . We obtain the exact value for f∈ (p)(r,z/f), where the Dirichlet integral (r,z/f) is given by (r,z/f)=|z|<r |(z/f(z))'|2 \,dx\, dy, (z=x+iy),~0<r≤ 1. We also obtain a sharp estimate for (r,z/f) whenever f belongs to certain subclasses of (p). Furthermore, we obtain sharp estimates of the integral means for the aforementioned classes of functions.