Title of article
The Smirnov remainders of uniformly locally connected proper metric spaces
Author/Authors
Akaike، نويسنده , , Yuji and Chinen، نويسنده , , Naotsugu and Tomoyasu، نويسنده , , Kazuo، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2011
Pages
15
From page
69
To page
83
Abstract
The aim of this paper is to investigate relations between uniform local connectedness and the dimension of the Smirnov remainder. In particular, we devote this paper to calculating the dimension of the Smirnov remainder u d R n ∖ R n of the n-dimensional Euclidean space ( R n , d ) with uniform local connectedness. We show that dim u d R ∖ R = ind u d R ∖ R = Ind u d R ∖ R = 1 if ( R , d ) is uniformly locally connected. Moreover, we introduce a new concept of “thin” covering spaces, and we have the following: If an infinite covering space ( R 2 , d ˜ ) of a compact 2-manifold is “thin”, then dim u d ˜ R 2 ∖ R 2 = ind u d ˜ R 2 ∖ R 2 = Ind u d ˜ R 2 ∖ R 2 = 2 .
Keywords
Uniformly locally connected , Smirnov compactification , Large inductive dimension
Journal title
Topology and its Applications
Serial Year
2011
Journal title
Topology and its Applications
Record number
1582739
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