Valence of complex-valued planar harmonic functions
摘要
The valence of a function at a point is the number of distinct, finite solutions to . Let be a complex-valued harmonic function in an open set . Let denote the critical set of and the global cluster set of . We show that partitions the complex plane into regions of constant valence. We give some conditions such that has empty interior. We also show that a component is a -fold covering of some component . If is simply connected, then is univalent on . We explore conditions for combining adjacent components to form a larger region of univalence. Those results which hold for functions on open sets in are first stated in that form and then applied to the case of planar harmonic functions. If is a light, harmonic function in the complex plane, we apply a structure theorem of Lyzzaik to gain information about the difference in valence between components of sharing a common boundary arc in .
引用
@article{arxiv.math/0401359,
title = {Valence of complex-valued planar harmonic functions},
author = {Genevra Neumann},
journal= {arXiv preprint arXiv:math/0401359},
year = {2007}
}
备注
31 pages, 10 figures. Question for geometers: Please email the author if you know of results similar to Theorem 3.4 in this paper