Endomorphisms That Are the Sum of a Unit and a Root of a Fixed Polynomial
Canadian mathematical bulletin, Tome 49 (2006) no. 2, pp. 265-269
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If $C=C\left( R \right)$ denotes the center of a ring $R$ and $g\left( x \right)$ is a polynomial in $C\left[ x \right]$ , Camillo and Simón called a ring $g\left( x \right)$ -clean if every element is the sum of a unit and a root of $g\left( x \right)$ . If $V$ is a vector space of countable dimension over a division ring $D$ , they showed that $\text{en}{{\text{d}}_{\,D}}V$ is $g\left( x \right)$ -clean provided that $g\left( x \right)$ has two roots in $C\left( D \right)$ . If $g\left( x \right)=x-{{x}^{2}}$ this shows that $\text{en}{{\text{d}}_{\,D}}V$ is clean, a result of Nicholson and Varadarajan. In this paper we remove the countable condition, and in fact prove that $\text{en}{{\text{d}}_{\,R}}M$ is $g\left( x \right)$ -clean for any semisimple module $M$ over an arbitrary ring $R$ provided that $g\left( x \right)\in \left( x-a \right)\left( x-b \right)C\left[ x \right] $ where $a,b\in C$ and both $b$ and $b-a$ are units in $R$ .
Mots-clés :
16S50, 16E50, Clean rings, linear transformations, endomorphism rings
Nicholson, W. K.; Zhou, Y. Endomorphisms That Are the Sum of a Unit and a Root of a Fixed Polynomial. Canadian mathematical bulletin, Tome 49 (2006) no. 2, pp. 265-269. doi: 10.4153/CMB-2006-027-6
@article{10_4153_CMB_2006_027_6,
author = {Nicholson, W. K. and Zhou, Y.},
title = {Endomorphisms {That} {Are} the {Sum} of a {Unit} and a {Root} of a {Fixed} {Polynomial}},
journal = {Canadian mathematical bulletin},
pages = {265--269},
year = {2006},
volume = {49},
number = {2},
doi = {10.4153/CMB-2006-027-6},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CMB-2006-027-6/}
}
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