On rings whose finitely generated left ideals are left annihilators of an element

Abstract

An associative ring R with identity is left pseudo-morphic if for every a∈R, there exists b∈R such that Ra=lR(b). If, in addition, lR(a)=Rb, then R is called left morphic. R is morphic if it is both left and right morphic. We characterize left pseudo-morphic rings; identify the cases a (left) pseudo morphic ring is (left) quasi-morphic, morphic, Quasi-Frobenius, von Neumann regular, etc.; correct two results in a book and a paper; and completely determine when the trivial extension of a commutative domain is morphic which positively answered a question in a paper.