The embedding structure for linearly ordered topological spaces
Abstract
In this paper, the class of all linearly ordered topological spaces (LOTS) quasi-ordered by the embeddability relation is investigated. In ZFC it is proved that for countable LOTS this quasi-order has both a maximal (universal) element and a finite basis. For the class of uncountable LOTS of cardinality it is proved that this quasi-order has no maximal element for at least the size of the continuum and that in fact the dominating number for such quasi-orders is maximal, i.e. . Certain subclasses of LOTS, such as the separable LOTS, are studied with respect to the top and internal structure of their respective embedding quasi-order. The basis problem for uncountable LOTS is also considered; assuming the Proper Forcing Axiom there is an eleven element basis for the class of uncountable LOTS and a six element basis for the class of dense uncountable LOTS in which all points have countable cofinality and coinitiality.
Cite
@article{arxiv.1102.2159,
title = {The embedding structure for linearly ordered topological spaces},
author = {Alex Primavesi and Katherine Thompson},
journal= {arXiv preprint arXiv:1102.2159},
year = {2011}
}