Landau-type theorems for K-quasiregular harmonic mappings

Abstract

In this paper, our aim is to establish several sharp and improved Landau-type theorems for K-quasiregular harmonic mappings f=h+g in the unit disk D = \z∈C: |z|<1\. Under various boundedness assumptions on the analytic part h or its derivative, we obtain explicit univalence radii and corresponding schlicht disk radii that significantly improve upon existing estimates in the literature. We also establish new Landau-type theorems under novel hypotheses. We provide examples to illustrate our results, and comprehensive numerical tables present quantitative values of the radii for various parameter choices, demonstrating the effectiveness of our results.

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