A normality Criterion for a Family of Meromorphic Functions

Abstract

Schwick, in [6], states that let F be a family of meromorphic functions on a domain D and if for each f∈F, (fn)(k)≠ 1, for z∈ D, where n, k are positive integers such that n≥ k+3, then F is a normal family in D. In this paper, we investigate the opposite view that if for each f∈F, (fn)(k)(z)-(z) has zeros in D, where (z) is a holomorphic function in D, then what can be said about the normality of the family F?