On (weakly) precious rings associated to central polynomials
DOI:
https://doi.org/10.5269/bspm.v36i2.31398Palavras-chave:
clean ring, g(x)-clean rings, g(x)-nil clean rings, precious rings, g(x)-precious ringsResumo
Let R be an associative ring with identity and let g(x) be a fixed polynomial over the center of R. We define R to be (weakly) g(x)-precious if for every element a∈R, there are a zero s of g(x), a unit u and a nilpotent b such that (a=±s+u+b) a=s+u+b. In this paper, we investigate many examples and properties of (weakly) g(x)-precious rings. If a and b are in the center of R with b-a is a unit, we give a characterizations for (weakly) (x-a)(x-b)-precious rings in terms of (weakly) precious rings. In particular, we prove that if 2 is a unit, then a ring is precious if and only it is weakly precious. Finally, for n∈ℕ, we study (weakly) (xâ¿-x)-precious rings and clarify some of their properties.Downloads
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2018-04-01
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