On Rings for which Homogeneous Maps are Linear
Work
Year: 1991
Type: article
Abstract: Let $R$ be the collection of all rings $R$ such that for every $R$-module $G$, the centralizer near-ring ${M_R}(G) = \{ f:G \to G|f(rx) = rf(x),r \in R,x \in G\}$ is a ring. We show $R \in R$ if and o... more
Authors P. Fuchs, C. J. Maxson, G. Pilz
Cites: 3
Cited by: 4
Related to: 10
FWCI: 1.283
Citation percentile (by year/subfield): 44.29
Topic: Rings, Modules, and Algebras
Subfield: Algebra and Number Theory
Field: Mathematics
Domain: Physical Sciences
Open Access status: bronze