Zariski topologies on groups
The $n$-th Zariski topology on a group $G$ is generated by the sub-base consiting of the cozero sets of monomials of degree $ le n$ on $G$. We prove that for each group $G$ the 2-nd Zariski topology i
The $n$-th Zariski topology on a group $G$ is generated by the sub-base consiting of the cozero sets of monomials of degree $\le n$ on $G$. We prove that for each group $G$ the 2-nd Zariski topology is not discrete and present an example of a group $G$ of cardinality continuum whose 2-nd Zariski topology has countable pseudocharacter. On the other hand, the non-topologizable group $G$ constructed by Ol’shanskii has discrete 665-th Zariski topology.
💡 Research Summary
The paper introduces a family of topologies on an arbitrary group G, called the n‑th Zariski topology 𝔃_{G^{n}}
📜 Original Paper Content
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