Productivity of the Zariski topology on groups
Commentationes Mathematicae Universitatis Carolinae, Tome 54 (2013) no. 2, pp. 219-237
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This paper investigates the productivity of the Zariski topology $\mathfrak Z_G$ of a group $G$. If $\mathcal G = \{G_i\mid i\in I\}$ is a family of groups, and $G = \prod_{i\in I}G_i$ is their direct product, we prove that $\mathfrak Z_G\subseteq \prod_{i\in I}\mathfrak Z_{G_i}$. This inclusion can be proper in general, and we describe the doubletons $\mathcal G = \{G_1,G_2\}$ of abelian groups, for which the converse inclusion holds as well, i.e., $\mathfrak Z_G = \mathfrak Z_{G_1}\times \mathfrak Z_{G_2}$. If $e_2\in G_2$ is the identity element of a group $G_2$, we also describe the class $\Delta$ of groups $G_2$ such that $G_1\times \{e_{2}\}$ is an elementary algebraic subset of ${G_1\times G_2}$ for every group $G_1$. We show among others, that $\Delta$ is stable under taking finite products and arbitrary powers and we describe the direct products that belong to $\Delta$. In particular, $\Delta$ contains arbitrary direct products of free non-abelian groups.
This paper investigates the productivity of the Zariski topology $\mathfrak Z_G$ of a group $G$. If $\mathcal G = \{G_i\mid i\in I\}$ is a family of groups, and $G = \prod_{i\in I}G_i$ is their direct product, we prove that $\mathfrak Z_G\subseteq \prod_{i\in I}\mathfrak Z_{G_i}$. This inclusion can be proper in general, and we describe the doubletons $\mathcal G = \{G_1,G_2\}$ of abelian groups, for which the converse inclusion holds as well, i.e., $\mathfrak Z_G = \mathfrak Z_{G_1}\times \mathfrak Z_{G_2}$. If $e_2\in G_2$ is the identity element of a group $G_2$, we also describe the class $\Delta$ of groups $G_2$ such that $G_1\times \{e_{2}\}$ is an elementary algebraic subset of ${G_1\times G_2}$ for every group $G_1$. We show among others, that $\Delta$ is stable under taking finite products and arbitrary powers and we describe the direct products that belong to $\Delta$. In particular, $\Delta$ contains arbitrary direct products of free non-abelian groups.
Classification :
20E22, 20F70, 20K25, 20K45, 22A05, 57M07
Keywords: Zariski topology; (elementary, additively) algebraic subset; $\delta$-word; universal word; verbal function; (semi) $\mathfrak Z$-productive pair of groups; direct product
Keywords: Zariski topology; (elementary, additively) algebraic subset; $\delta$-word; universal word; verbal function; (semi) $\mathfrak Z$-productive pair of groups; direct product
@article{CMUC_2013_54_2_a7,
author = {Dikranjan, D. and Toller, D.},
title = {Productivity of the {Zariski} topology on groups},
journal = {Commentationes Mathematicae Universitatis Carolinae},
pages = {219--237},
year = {2013},
volume = {54},
number = {2},
mrnumber = {3067705},
zbl = {1274.20038},
language = {en},
url = {http://geodesic.mathdoc.fr/item/CMUC_2013_54_2_a7/}
}
Dikranjan, D.; Toller, D. Productivity of the Zariski topology on groups. Commentationes Mathematicae Universitatis Carolinae, Tome 54 (2013) no. 2, pp. 219-237. http://geodesic.mathdoc.fr/item/CMUC_2013_54_2_a7/