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Valency of Certain Complex-valued Functions

Complex Variables 2023-05-16 v1

Abstract

The valence of a function f at a point z0z_0 is the number of distinct, finite solutions to f(z)=z0.f(z) = z_0. In this paper, we bound the valence of complex-valued harmonic polynomials in the plane for some special harmonic polynomials of the form f(z)=p(z)q(z),f(z) =p(z)\overline{q(z)}, where p(z)p(z) is an analytic polynomial of degree nn and q(z)q(z) is an analytic polynomial of degree m,m, and q(z)αp(z)q(z) \neq \alpha p(z) for some constant α.\alpha. Using techniques of complex dynamics used in the work Sheil-Small and Wilmshurst on the valence of harmonic polynomials, we prove that the harmonic polynomial f(z)=p(z)q(z)f(z) = p(z)q(z) has the valency of m+n.m + n.

Keywords

Cite

@article{arxiv.2305.08606,
  title  = {Valency of Certain Complex-valued Functions},
  author = {Oluma Ararso Alemu},
  journal= {arXiv preprint arXiv:2305.08606},
  year   = {2023}
}

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6 Pages

R2 v1 2026-06-28T10:34:40.820Z