Commutators and products of Lie ideals of prime rings
Abstract
Motivated by some recent results on Lie ideals, it is proved that if L is a Lie ideal of a simple ring R with center Z(R), then L⊂eq Z(R), L=Z(R)a+Z(R) for some noncentral a∈ L, or [R, R]⊂eq L, which gives a generalization of a classical theorem due to Herstein. We also study commutators and products of noncentral Lie ideals of prime rings. Precisely, let R be a prime ring with extended centroid C. We completely characterize Lie ideals L and elements a of R such that L+aL contains a nonzero ideal of R. Given noncentral Lie ideals K, L of R, it is proved that [K, L]=0 if and only if KC=LC=Ca+C for any noncentral element a∈ L. As a consequence, we characterize noncentral Lie ideals K1,…,Km with m≥ 2 such that K1K2·s Km contains a nonzero ideal of R. Finally, we characterize noncentral Lie ideals Kj's and Lk's satisfying [K1K2·s Km, L1L2·s Ln]=0 from the viewpoint of centralizers.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.