Quasiconformal Extension of Meromorphic Functions with High-Order Poles
Abstract
In this paper, we study the class (m)(p) of meromorphic univalent functions f in D with a pole of order m ≥ 1 at p ∈ (0,1), admitting a k-quasiconformal extension (0 ≤ k < 1) to C. Using the Area Theorem and convolution methods, we establish a generalized area-type inequality and derive explicit analytic membership conditions for (m)(p). We also extend the convolution theorem to a modified Hadamard product of m functions, fj ∈ (m)kj(p), determining sufficient conditions for the product to be in (m)α(p), with α defined by kj and p. Further results include a sufficient criterion for sense-preserving harmonic mappings on convex domains to admit quasiconformal extensions, and the sharp Schwarzian norm for f ∈ k(p) (the m=1 case). These findings improve upon existing results of [ Proc. Amer. Math. Soc., 144(6) (2016), 2593--2601].
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