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Abstract
A ring R is said to satisfy the Goodearl–Menal condition if for any x, y ∈ R, there exists a unit u of R such that both x − u and y − u −1 are units of R. It is proved that if R is a semilocal ring or an exchange ring with primitive factors Artinian, then R satisfies the Goodearl–Menal condition if and only if no homomorphic image of R is isomorphic to either ℤ2 or ℤ3 or 𝕄2(ℤ2). These results correct two existing results. Some consequences are discussed.
2010 Mathematics Subject Classification:
ACKNOWLEDGMENTS
The authors are grateful to the referee for his/her thorough reading the manuscript and for valuable comments and suggestions which have improved the presentation of this work. Chunna Li acknowledges support by the State Scholarship Fund from China Scholarship Council. Lu Wang and Yiqiang Zhou acknowledge support by a Discovery Grant from the Natural Sciences and Engineering Research Council of Canada.
Notes
Communicated by I. Swanson.