d-ideals,f d-ideals and prime ideals |
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Abstract: | AbstractLet R be a commutative ring. An ideal I of R is called a d-ideal (f d-ideal) provided that for each a ∈ I (finite subset F of I) and b ∈ R, Ann(a) ? Ann(b) (Ann(F) ? Ann(b)) implies that b ∈ I. It is shown that, the class of z0-ideals (hence all sz0-ideals), maximal ideals in an Artinian or in a Kasch ring, annihilator ideals, and minimal prime ideals over a d-ideal are some distinguished classes of d-ideals. Furthermore, we introduce the class of f d-ideals as a subclass of d-ideals in a commutative ring R. In this regard, it is proved that the ring R is a classical ring with property (A) if and only if every maximal ideal of R is an f d-ideal. The necessary and sufficient condition for which every prime f d-ideal of a ring R being a maximal or a minimal prime ideal is given. Moreover, the rings for which their prime d-ideals are z0-ideals are characterized. Finally, we prove that every prime f d-ideal of a ring R is a minimal prime ideal if and only if for each a ∈ R there exists a finitely generated ideal ![/></span>, for some <i>n</i> ∈ ? such that Ann(<i>a</i>, <i>I</i>) = 0. As a consequence, every prime <i>f d</i>-ideal in a reduced ring <i>R</i> is a minimal prime ideal if and only if <i>X</i>= Min(<i>R</i>) is a compact space.</td>
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Keywords: | Primary 13A15 Secondary 54C40 |
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