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On uniquely $π$-clean rings

An element of a ring is unique clean if it can be uniquely written as the sum of an idempotent and a unit. A ring $R$ is uniquely $π$-clean if some power of every element in $R$ is uniquely clean. In this article, we prove that a ring $R$ is uniquely $π$-clean if and only if for any $a\in R$, there exists an $m\in {\Bbb N}$ and a central idempotent $e\in R$ such that $a^m-e\in J(R)$, if and only if $R$ is abelian; every idempotent lifts modulo $J(R)$; and $R/P$ is torsion for all prime ideals $P$ containing the Jacobson radical $J(R)$. Further, we prove that a ring $R$ is uniquely $π$-clean and $J(R)$ is nil if and only if $R$ is an abelian periodic ring, if and only if for any $a\in R$, there exists some $m\in {\Bbb N}$ and a unique idempotent $e\in R$ such that $a^m-e\in P(R)$, where $P(R)$ is the prime radical of $R$.