Left-Separating Order Types
Abstract
A well ordering < of a topological space X is "left-separating" if is closed in X for any x in X. A space is "left-separated" if it has a left-separating well-ordering. The left-separating type, , of a left-separated space X is the minimum of the order types of the left-separating well orderings of X. We prove that (1) if is a regular cardinal, then for each ordinal there is a space with ; (2) if and , then for each ordinal there is a 0-dimensional space with ; (3) if or , where , then for each ordinal there is a locally compact, locally countable, 0-dimensional space with . The union of two left-separated spaces is not necessarily left-separated. We show, however, that if X is a countably tight space, , , then is also left-separated and . We prove that it is consistent that there is a first countable, 0-dimensional space X, which is not left-separated, but there is a c.c.c poset Q such that in the generic extension we have . However, if is a topological space and is a c.c.c poset such that in in the generic extension we have then X is left-separated even in .
Keywords
Cite
@article{arxiv.1609.09695,
title = {Left-Separating Order Types},
author = {Lajos Soukup and Adrienne Stanley},
journal= {arXiv preprint arXiv:1609.09695},
year = {2018}
}
Comments
revised version with some new results, 23 pages