LOCALIZATION OF MODULAR LATTICES, KRULL DIMENSION, AND THE HOPKINS-LEVITZKI THEOREM. II
Copyright policy )LOCALIZATION OF MODULAR LATTICES, KRULL DIMENSION, AND THE HOPKINS-LEVITZKI THEOREM. II
The Hopkins–Levitzki Theorem, discovered independently in 1939 by C. Hopkins and J. Levitzki states that a right Artinian ring with identity is right Noetherian. In the 1970s and 1980s it has been generalized to modules over non-unital rings by Shock[10], to modules satisfying the descending chain condition relative to a heriditary torsion theory by Miller-Teply[7], to Grothendieck categories by Năstăsescu [8], and to upper continuous modular lattices by Albu [1]. The importance of the relative Hopkins-Levitzki Theorem in investigating the structure of some relevant classes of modules, including injectives as well as projectives is revealed in [3] and [6], where the main body of both these monographs deals with this topic. A discussion on the various forms of the Hopkins–Levitzki Theorem for modules and Grothendieck categories and the connection between them may be found in [3].
- University of Bucharest Romania
- University of Glasgow United Kingdom
Artinian rings and modules (associative rings and algebras), artinian modular lattice, Modular lattices, Desarguesian lattices, Noetherian rings and modules (associative rings and algebras), Serre class, Chain conditions on other classes of submodules, ideals, subrings, etc.; coherence (associative rings and algebras), Hopkins-Levitzki theorem, noetherian modular lattice, localization
Artinian rings and modules (associative rings and algebras), artinian modular lattice, Modular lattices, Desarguesian lattices, Noetherian rings and modules (associative rings and algebras), Serre class, Chain conditions on other classes of submodules, ideals, subrings, etc.; coherence (associative rings and algebras), Hopkins-Levitzki theorem, noetherian modular lattice, localization
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