Centers of a dendroid

Jo Heath; Van C. Nall

Fundamenta Mathematicae (2006)

  • Volume: 189, Issue: 2, page 173-183
  • ISSN: 0016-2736

Abstract

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A bottleneck in a dendroid is a continuum that intersects every arc connecting two non-empty open sets. Piotr Minc proved that every dendroid contains a point, which we call a center, contained in arbitrarily small bottlenecks. We study the effect that the set of centers in a dendroid has on its structure. We find that the set of centers is arc connected, that a dendroid with only one center has uncountably many arc components in the complement of the center, and that, in this case, every open set intersects uncountably many of these arc components. Moreover, we find that a map from one dendroid to another preserves the center structure if each point inverse has at most countably many components.

How to cite

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Jo Heath, and Van C. Nall. "Centers of a dendroid." Fundamenta Mathematicae 189.2 (2006): 173-183. <http://eudml.org/doc/283231>.

@article{JoHeath2006,
abstract = {A bottleneck in a dendroid is a continuum that intersects every arc connecting two non-empty open sets. Piotr Minc proved that every dendroid contains a point, which we call a center, contained in arbitrarily small bottlenecks. We study the effect that the set of centers in a dendroid has on its structure. We find that the set of centers is arc connected, that a dendroid with only one center has uncountably many arc components in the complement of the center, and that, in this case, every open set intersects uncountably many of these arc components. Moreover, we find that a map from one dendroid to another preserves the center structure if each point inverse has at most countably many components.},
author = {Jo Heath, Van C. Nall},
journal = {Fundamenta Mathematicae},
keywords = {dendroid; bottleneck center},
language = {eng},
number = {2},
pages = {173-183},
title = {Centers of a dendroid},
url = {http://eudml.org/doc/283231},
volume = {189},
year = {2006},
}

TY - JOUR
AU - Jo Heath
AU - Van C. Nall
TI - Centers of a dendroid
JO - Fundamenta Mathematicae
PY - 2006
VL - 189
IS - 2
SP - 173
EP - 183
AB - A bottleneck in a dendroid is a continuum that intersects every arc connecting two non-empty open sets. Piotr Minc proved that every dendroid contains a point, which we call a center, contained in arbitrarily small bottlenecks. We study the effect that the set of centers in a dendroid has on its structure. We find that the set of centers is arc connected, that a dendroid with only one center has uncountably many arc components in the complement of the center, and that, in this case, every open set intersects uncountably many of these arc components. Moreover, we find that a map from one dendroid to another preserves the center structure if each point inverse has at most countably many components.
LA - eng
KW - dendroid; bottleneck center
UR - http://eudml.org/doc/283231
ER -

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