Journal of Siberian Federal University. Mathematics & Physics: On the Equationally Artinian Groups

Journal of Siberian Federal University. Mathematics & Physics / On the Equationally Artinian Groups

Issue: Journal of Siberian Federal University. Mathematics & Physics. 2020 13 (5)
Authors: Shahryari, Mohammad; Tayyebi, Javad
Contact information: Shahryari, Mohammad: Faculty of Mathematical Sciences University of Tabriz Tabriz, Iran; ; Tayyebi, Javad: Faculty of Mathematical Sciences University of Tabriz Tabriz, Iran;
Keywords: algebraic geometry over groups; systems of group equations; radicals; Zariski topology; radical topology; equationally Noetherian groups; equationally Artinian groups
Abstract: In this article, we study the property of being equationally Artinian in groups. We define the radical topology corresponding to such groups and investigate the structure of irreducible closed sets of these topologies. We prove that a finite extension of an equationally Artinian group is again equationally Artinian. We also show that a quotient of an equationally Artinian group of the form G[t] by a normal subgroup which is a finite union of radicals, is again equationally Artnian. A necessary and sufficient condition for an Abelian group to be equationally Artinian will be given as the last result. This will provide a large class of examples of equationally Artinian groups
Pages: 583–595
DOI: 10.17516/1997-1397-2020-13-5-583-595
Paper at repository of SibFU: https://elib.sfu-kras.ru/handle/2311/135912