@Article{CMR-32-1, author = {Yao, Wang and Meimei, Jiang and Yanli, Ren}, title = {Ore Extensions over Weakly 2-Primal Rings}, journal = {Communications in Mathematical Research }, year = {2016}, volume = {32}, number = {1}, pages = {70--82}, abstract = {
A weakly 2-primal ring is a common generalization of a semicommutative ring, a 2-primal ring and a locally 2-primal ring. In this paper, we investigate Ore extensions over weakly 2-primal rings. Let $α$ be an endomorphism and $δ$ an $α$-derivation of a ring $R$. We prove that (1) If $R$ is an $(α, δ)$-compatible and weakly 2-primal ring, then $R[x; α, δ]$ is weakly semicommutative; (2) If $R$ is $(α, δ)$-compatible, then $R$ is weakly 2-primal if and only if $R[x; α, δ]$ is weakly 2-primal.
}, issn = {2707-8523}, doi = {https://doi.org/10.13447/j.1674-5647.2016.01.05}, url = {https://global-sci.com/article/81660/ore-extensions-over-weakly-2-primal-rings} }