In non-commutative algebra and group theory, an algebra or group is locally nilpotent if and only if every finitely generated subalgebra or subgroup is nilpotent. The subgroup generated by the normal locally nilpotent subgroups is called the Hirsch–Plotkin radical and is the generalization of the Fitting subgroup to groups without the ascending chain condition on normal subgroups.
A locally nilpotent ring is one in which every finitely generated subring is nilpotent: locally nilpotent rings form a radical class, giving rise to the Levitzki radical.[1]
Referencesedit
^ abJacobson, Nathan (1956). Structure of Rings. Providence, Rhode Island: Colloquium Publications. p. 197. ISBN978-0-8218-1037-8.
locally, nilpotent, this, article, needs, additional, citations, verification, please, help, improve, this, article, adding, citations, reliable, sources, unsourced, material, challenged, removed, find, sources, news, newspapers, books, scholar, jstor, january. This article needs additional citations for verification Please help improve this article by adding citations to reliable sources Unsourced material may be challenged and removed Find sources Locally nilpotent news newspapers books scholar JSTOR January 2024 Learn how and when to remove this template message In the mathematical field of commutative algebra an ideal I in a commutative ring A is locally nilpotent at a prime ideal p if Ip the localization of I at p is a nilpotent ideal in Ap 1 In non commutative algebra and group theory an algebra or group is locally nilpotent if and only if every finitely generated subalgebra or subgroup is nilpotent The subgroup generated by the normal locally nilpotent subgroups is called the Hirsch Plotkin radical and is the generalization of the Fitting subgroup to groups without the ascending chain condition on normal subgroups A locally nilpotent ring is one in which every finitely generated subring is nilpotent locally nilpotent rings form a radical class giving rise to the Levitzki radical 1 References edit a b Jacobson Nathan 1956 Structure of Rings Providence Rhode Island Colloquium Publications p 197 ISBN 978 0 8218 1037 8 nbsp This commutative algebra related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Locally nilpotent amp oldid 1193844465, wikipedia, wiki, book, books, library,
