Zariski topologies on groups
Group Theory
2010-01-06 v1 General Topology
Abstract
The -th Zariski topology on a group is generated by the sub-base consiting of the cozero sets of monomials of degree on . We prove that for each group the 2-nd Zariski topology is not discrete and present an example of a group of cardinality continuum whose 2-nd Zariski topology has countable pseudocharacter. On the other hand, the non-topologizable group constructed by Ol'shanskii has discrete 665-th Zariski topology.
Cite
@article{arxiv.1001.0601,
title = {Zariski topologies on groups},
author = {Taras Banakh and Igor Protasov},
journal= {arXiv preprint arXiv:1001.0601},
year = {2010}
}
Comments
6 pages