Kyriakos Papadopoulos
Published 2017-10-18Version 1
By considering nests on a given space, we explore order-theoretical and topological properties that are closely related to the structure of a nest. In particular, we see how subbases given by two dual nests can be an indicator of how close or far are the properties of the space from the structure of a linearly ordered space. Having in mind that the term interlocking nest is a key tool to a general solution of the orderability problem, we give a characterization of interlocking nest via closed sets in the Alexandroff topology and via lower sets, respectively. We also characterize bounded subsets of a given set in terms of nests and, finally, we explore the possibility of characterizing topological groups via properties of nests. All sections are followed by a number of open questions, which may give new directions to the orderability problem.
Comments: This paper has been published in the journal: Q & A in General Topology (Vol. 33, No 2, 2015.). arXiv admin note: substantial text overlap with arXiv:1302.2519
Journal: Questions and Answers in General Topology, Volume 33, Number 2, 2015
Nests, and their Role in the Orderability Problem
Special metrics
A weakly Lindelöf space which does not have the property $^*\mathcal{U}_{fin}(\mathcal{O},\mathcal{O})$
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