Bloch and Landau constants for meromorphic functions

Abstract

Let M1(λ) be the class of all meromorphic functions f in the unit disk D=\z∈C\: |z|<1 having a simple pole at λ ∈ D \0\ and satisfying the normalization f'(0)=1. Let B(λ) and L(λ) denote the Bloch and Landau constants, respectively, for this class. In this article, we first show that the Bloch constant B(1) and the Landau constant L(1) are infinite. Using these results and a conformal mapping technique, we establish that B(p) and L(p) are likewise infinite for any p ∈ (0,1), thereby refuting a recent conjecture. Finally, we extend our study to the class of meromorphic functions having two simple poles and prove that their associated Bloch and Landau constants also remain infinite.

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