English

On Lambda Function and a Quantification of Torhorst Theorem

General Topology 2021-04-19 v2

Abstract

To any compact KC^K\subset\hat{\mathbb{C}} we associate a map λK:C^N{}\lambda_K: \hat{\mathbb{C}}\rightarrow\mathbb{N}\cup\{\infty\} -- the lambda function of KK -- such that a planar continuum KK is locally connected if and only if ΛK(x)0\Lambda_K(x)\equiv0. We establish basic methods of determining the lambda function λK\lambda_K for specific compacta KC^K\subset\hat{\mathbb{C}}, including a gluing lemma for lambda functions and some inequalities. One of these inequalities comes from an interplay between the topological difficulty of a planar compactum KK and that of a sub-compactum LKL\subset K, lying on the boundary of a component of C^K\hat{\mathbb{C}}\setminus K. It generalizes and quantifies the result of Torhorst Theorem, a fundamental result from plane topology. We also find three conditions under which this inequality is actually an equality. Under one of these conditions, this equality provides a quantitative version for Whyburn's Theorem, which is a partial converse to Torhorst Theorem.

Keywords

Cite

@article{arxiv.2002.08638,
  title  = {On Lambda Function and a Quantification of Torhorst Theorem},
  author = {Li Feng and Jun Luo and Xiao-Ting Yao},
  journal= {arXiv preprint arXiv:2002.08638},
  year   = {2021}
}
R2 v1 2026-06-23T13:47:51.776Z