Cantor tree

In mathematical set theory, the Cantor tree is either the full binary tree of height ω + 1, or a topological space related to this by joining its…

Papers overview

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2019

The main focus of this paper is the concept of a moving oﬀ collection of sets. We will be looking at how this relatively lesser…

2018

In this paper, for a non compact and orientable surface $S$ been either: the Infinite Loch Ness monster, the Cantor tree and the…

2014

We investigate several problems in the theory of convergence spaces: generalization of Kolmogorov separation from topological…

2010

Let X C 2°> and TuX be the Cantor tree over X . We show that Q(ru^) is a Baire space if and only if X is a y-set. We obtain from…

Review

2009

Review

2009

We present an overview update of the metrologic approach to be employed for the segmented mirror fabrication for the IXO soft x…

2008

Abstract We continue the investigation of Gregory trees and the Cantor Tree Property carried out by Hart and Kunen. We produce…

1992

A.V. Arkhangel'skii asked that, is it true that every space $Y$ of countable tightness is homeomorphic to a subspace (to a closed…

1978

Call X an AD-space (for "almost-Dowker") if it is T3 but not countably metacompact. We construct, without set-theoretic…