English

Notes on the Level Curves of a Meromorphic Function

Complex Variables 2013-06-25 v1

Abstract

The subject of this paper is the bounded level curves of a meromorphic function ff with domain GG such that each component of G\partial{G} consists of a level curve of ff. (A primary example of such a function being a ratio of finite Blaschke products of different degrees, with domain D\mathbb{D}.) We will first prove several facts about a single bounded level curve of a ff in isolation from the other level curves of ff. We will then study how the level curves of ff lie with respect to each other. It is natural to expect that the sets {z:f(z)=ϵ}\{z:|f(z)|=\epsilon\} vary continuously as ϵ\epsilon varies. We will make this notion explicit, and use this continuity to prove several results about the bounded level curves of ff. It is well known that if z0z_0 is a zero or a pole of ff, then ff is conformally equivalent to the function zzkz\mapsto{z^k} (for some kZk\in\mathbb{Z}) in a neighborhood of z0z_0. We generalize this fact by finding a natural decomposition of GG into finitely many sub-regions (also bounded by level curves of ff), on each of which ff is conformally equivalent to zzkz\mapsto{z^k} (for some kZk\in\mathbb{Z}). Also included is a new proof, using level curves, of the Gauss--Lucas theorem that the critical points of a polynomial are contained in the convex hull of the polynomial's zeros.

Keywords

Cite

@article{arxiv.1306.5506,
  title  = {Notes on the Level Curves of a Meromorphic Function},
  author = {Trevor Richards},
  journal= {arXiv preprint arXiv:1306.5506},
  year   = {2013}
}

Comments

18 pages, 6 figures

R2 v1 2026-06-22T00:38:58.098Z