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Strongly 2-nil-clean rings with involutions

Huanyin ChenMarjan Sheibani Abdolyousefi — 2019

Czechoslovak Mathematical Journal

A * -ring R is strongly 2-nil- * -clean if every element in R is the sum of two projections and a nilpotent that commute. Fundamental properties of such * -rings are obtained. We prove that a * -ring R is strongly 2-nil- * -clean if and only if for all a R , a 2 R is strongly nil- * -clean, if and only if for any a R there exists a * -tripotent e R such that a - e R is nilpotent and e a = a e , if and only if R is a strongly * -clean SN ring, if and only if R is abelian, J ( R ) is nil and R / J ( R ) is * -tripotent. Furthermore, we explore the structure...

Rings consisting entirely of certain elements

Huanyin ChenMarjan SheibaniNahid Ashrafi — 2018

Czechoslovak Mathematical Journal

We completely determine when a ring consists entirely of weak idempotents, units and nilpotents. We prove that such ring is exactly isomorphic to one of the following: a Boolean ring; 3 3 ; 3 B where B is a Boolean ring; local ring with nil Jacobson radical; M 2 ( 2 ) or M 2 ( 3 ) ; or the ring of a Morita context with zero pairings where the underlying rings are 2 or 3 .

Certain decompositions of matrices over Abelian rings

Nahid AshrafiMarjan SheibaniHuanyin Chen — 2017

Czechoslovak Mathematical Journal

A ring R is (weakly) nil clean provided that every element in R is the sum of a (weak) idempotent and a nilpotent. We characterize nil and weakly nil matrix rings over abelian rings. Let R be abelian, and let n . We prove that M n ( R ) is nil clean if and only if R / J ( R ) is Boolean and M n ( J ( R ) ) is nil. Furthermore, we prove that R is weakly nil clean if and only if R is periodic; R / J ( R ) is 3 , B or 3 B where B is a Boolean ring, and that M n ( R ) is weakly nil clean if and only if M n ( R ) is nil clean for all n 2 .

Certain additive decompositions in a noncommutative ring

Huanyin ChenMarjan SheibaniRahman Bahmani — 2022

Czechoslovak Mathematical Journal

We determine when an element in a noncommutative ring is the sum of an idempotent and a radical element that commute. We prove that a 2 × 2 matrix A over a projective-free ring R is strongly J -clean if and only if A J ( M 2 ( R ) ) , or I 2 - A J ( M 2 ( R ) ) , or A is similar to 0 λ 1 μ , where λ J ( R ) , μ 1 + J ( R ) , and the equation x 2 - x μ - λ = 0 has a root in J ( R ) and a root in 1 + J ( R ) . We further prove that f ( x ) R [ [ x ] ] is strongly J -clean if f ( 0 ) R be optimally J -clean.

On feebly nil-clean rings

Marjan Sheibani AbdolyousefiNeda Pouyan — 2024

Czechoslovak Mathematical Journal

A ring R is feebly nil-clean if for any a R there exist two orthogonal idempotents e , f R and a nilpotent w R such that a = e - f + w . Let R be a 2-primal feebly nil-clean ring. We prove that every matrix ring over R is feebly nil-clean. The result for rings of bounded index is also obtained. These provide many classes of rings over which every matrix is the sum of orthogonal idempotent and nilpotent matrices.

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