Not every countable complete lattice is sober
Abstract
The study of the sobriety of Scott spaces has got an relative long history in domain theory. Lawson and Hoffmann independently proved that the Scott space of every continuous directed complete poset (usually called domain) is sober. Johnstone constructed the first directed complete poset whose Scott space is non-sober. Not long after, Isbell gave a complete lattice with non-sober Scott space. Based on Isbell's example, Xu, Xi and Zhao showed that there is even a complete Heyting algebra whose Scott space is non-sober. Achim Jung then asked whether every countable complete lattice has a sober Scott space. Let be the Scott space of poset . In this paper, we first prove that the topology of the product space coincides with the Scott topology on the product poset if the set and of all non-trivial ideals of posets and are both countable. Based on this result, we deduce that a directed complete poset has a sober Scott space, if is countable and the space is coherent and well-filtered. Thus a complete lattice with countable has a sober Scott space. Making use the obtained results, we then construct a countable complete lattice whose Scott space is non-sober and thus give a negative answer to Jung's problem.
Keywords
Cite
@article{arxiv.2205.00250,
title = {Not every countable complete lattice is sober},
author = {Hualin Miao and Xiaoyong Xi and Qingguo Li and Dongsheng Zhao},
journal= {arXiv preprint arXiv:2205.00250},
year = {2022}
}
Comments
20 pages