reversibility of a module with respect to the bifunctors hom and rej
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abstract
let $m_r$ be a non-zero module and ${mathcal f}: sigma[m_r]times sigma[m_r] rightarrow$ mod-$bbb{z}$ a bifunctor. the $mathcal{f}$-reversibility of $m$ is defined by ${mathcal f}(x,y)=0 rightarrow {mathcal f}(y,x)=0$ for all non-zero $x,y$ in $sigma[m_r]$. hom (resp. rej)-reversibility of $m$ is characterized in different ways. among other things, it is shown that $r_r$ {rm($_rr$)} is hom-reversible if and only if $r = bigoplus_{i=1}^n r_i$ such that each $r_i$ is a perfect ring with a unique simple module (up to isomorphism). in particular, for a duo ring, the concepts of perfectness and hom-reversibility coincide.
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Journal title:
bulletin of the iranian mathematical societyPublisher: iranian mathematical society (ims)
ISSN 1017-060X
volume 40
issue 4 2014
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