Rings such that, for each unit u, un-1 belongs to the (R)
Abstract
We study in-depth those rings R for which, there exists a fixed n≥ 1, such that un-1 lies in the subring (R) of R for every unit u∈ R. We succeeded to describe for any n≥ 1 all reduced π-regular (2n-1)- rings by showing that they satisfy the equation x2n=x as well as to prove that the property of being exchange and clean are tantamount in the class of (2n-1)- rings. These achievements considerably extend results established by Danchev (Rend. Sem. Mat. Univ. Pol. Torino, 2019) and Kosan et al. (Hacettepe J. Math. \& Stat., 2020). Some other closely related results of this branch are also established.
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