On Scott power spaces
Abstract
In this paper, we mainly discuss some basic properties of Scott power spaces. For a space , let be the poset of all nonempty compact saturated subsets of endowed with the Smyth order. It is proved that the Scott power space of a well-filtered space is still well-filtered, and a space is well-filtered iff is well-filtered and the upper Vietoris topology is coarser than the Scott topology on . A sober space is constructed for which its Scott power space is not sober. A few sufficient conditions are given under which a Scott power space is sober. Some other properties, such as local compactness, first-countability, Rudin property and well-filtered determinedness, of Smyth power spaces and Scott power spaces are also investigated.
Keywords
Cite
@article{arxiv.2207.08720,
title = {On Scott power spaces},
author = {Xiaoquan Xu and Xinpeng Wen and Xiaoyong Xi},
journal= {arXiv preprint arXiv:2207.08720},
year = {2022}
}
Comments
29 papes, 5 figures