Prethick subsets and partitions of metric spaces

Prethick subsets and partitions of metric spaces

A subset $A$ of a metric space $(X,d)$ is called thick if, forevery $r>0$, there is $ain A$ such that $B_{d}(a,r)subseteqA,$ where $B_{d}(a,r)={xin Xcolon d(x,a)leq r}$. We showthat if $(X, d)$ is unbounded and has no asymptoticallyisolated balls then, for each $r>0$, there exists a partition$...

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Bibliographic Details
Main Author:	K. D. Protasova
Format:	Article
Language:	deu
Published:	Ivan Franko National University of Lviv 2012-11-01
Series:	Математичні Студії
Subjects:	metric space thick and prethick subsets asymptotically isolated balls
Online Access:	http://matstud.org.ua/texts/2012/38_2/115-117.pdf
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