Some New Classes of Rings Which Have the McCoy Condition

Abstract

We define here the notion of a weakly reversible ring R saying that a non-zero element a∈ R is weakly reversible if there exists an integer m>0 depending on a such that am≠ 0 is reversible, that is, rR(am)=lR(am). In addition, R is weakly reversible if all its elements are weakly reversible. It is shown that all weakly reversible rings are abelian McCoy rings and so, particularly, they are abelian 2-primal rings. Moreover, we construct a weakly reversible ring which is not reversible. We also show that if R is a weakly reversible ring, then the polynomial ring R[x] is strongly AB. Thus, in particular, the weakly reversible ring R is zip if, and only if, R[x] is zip. We, moreover, prove that if R is a weakly reversible ring and every prime ideal of R is maximal, then both R and R[x] are AB rings.

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