On homogeneous locally conical spaces

被引：1

作者：

Ancel, Fredric D. ^{[1
]}

Bellamy, David P. ^{[2
]}

机构：

[1] Univ Wisconsin, Dept Math Sci, Box 413, Milwaukee, WI 53201 USA

[2] Univ Delaware, Dept Math, Newark, DE 19716 USA

来源：

FUNDAMENTA MATHEMATICAE | 2018年 / 241卷 / 01期

关键词：

homogeneous space; locally conical space; Bing-Borsuk conjecture;

D O I：

10.4064/fm282-4-2017

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

The main result of this article is: THEOREM. Every homogeneous locally conical connected separable metric space that is not a 1-manifold is strongly n-homogeneous for each n >= 2. Furthermore, every homogeneous locally conical separable metric space is countable dense homogeneous. This theorem has the following two consequences. COROLLARY 1. If X is a homogeneous compact suspension, then X is an absolute suspension (i.e., for any two distinct points p and q of X there is a homeomorphism from X to a suspension that maps p and q to the suspension points). COROLLARY 2. If there exists a locally conical counterexample X to the Bing-Borsuk Conjecture (i.e., X is a locally conical homogeneous Euclidean neighborhood retract that is not a manifold), then each component of X is strongly n-homogeneous for all n >= 2 and X is countable dense homogeneous.

引用

页码：1 / 15

页数：15

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