On semiperfect $a$-rings
Abstract
UDC 512.5
A ring is called a right $a$-ring if every right ideal is automorphism invariant. We describe some properties of $a$-rings over semiperfect rings. It is shown that an I-finite right $a$-ring is a direct sum of a semisimple Artinian ring and a basic ring. It is also demonstrated that if $R$ is an indecomposable (as a ring) I-finite right $a$-ring not simple with nontrivial idempotents such that every minimal right ideal is a right annihilator and ${\rm Soc}(R_R)={\rm Soc}(_RR)$ is essential in $R_R$, then $R$ is a quasi-Frobenius ring and it is also a right $q$-ring.
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