Inequalities for Meromorphic functions with Prescribed Poles
DOI:
https://doi.org/10.13108/2024-16-1-127Keywords:
polynomials, Blaschke product, inequalities, rational functionsAbstract
For a rational function $P\in \mathcal{P}_n,$ Dewan et al.[J. Math Anal. Appl.\textbf{363(1),}(2010), 38-41] proved:
$$\bigg|zP'(z)+\dfrac{n\beta}{2}P(z)\bigg|\geq n\bigg|1+\dfrac{\beta}{2}\bigg|\min \limits_{z\in T_k}{|P(z)|}.$$
In this paper we prove some refinements of Bernstein-type inequalities for meromorphic functions with prescribed poles and restricted zeros. These results not only generalize some inequalities for rational functions but also improve as well as generalize some polynomial inequalities too.
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Published
15.03.2024
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