Null, recursively starlike-equivalent decompositions shrink
Abstract
A subset of a metric space is said to be starlike-equivalent if it has a neighbourhood which is mapped homeomorphically into for some , sending to a starlike set. A subset is said to be recursively starlike-equivalent if it can be expressed as a finite nested union of closed subsets such that is starlike-equivalent for each and is a point. A decomposition of a metric space is said to be recursively starlike-equivalent, if there exists such that each element of is recursively starlike-equivalent of filtration length . We prove that any null, recursively starlike-equivalent decomposition of a compact metric space shrinks, that is, the quotient map is the limit of a sequence of homeomorphisms. This is a strong generalisation of results of Denman-Starbird and Freedman and is applicable to the proof of Freedman's celebrated disc embedding theorem. The latter leads to a multitude of foundational results for topological -manifolds, including the -dimensional Poincar\'{e} conjecture.
Cite
@article{arxiv.1909.06165,
title = {Null, recursively starlike-equivalent decompositions shrink},
author = {Jeffrey Meier and Patrick Orson and Arunima Ray},
journal= {arXiv preprint arXiv:1909.06165},
year = {2024}
}
Comments
11 pages, 2 figures