Rings for which every cyclic module is dual automorphism-invariant (Q2801825)

The notion of dual automorphism-invariant modules was introduced by the reviewer and \textit{S. Singh} in [J. Algebra 371, 262--275 (2012; Zbl 1276.16003)]. For automorphism-invariant modules, in [J. Algebra 379, 223--229 (2013; Zbl 1287.16007)] \textit{N. Er} et al. provided the structure of rings over which each cyclic module is automorphism-invariant. The paper under review studies rings over which each cyclic module is dual automorphism-invariant. Among other things, the authors show that each cyclic module over a semiperfect ring \(R\) is dual automorphism-invariant if and only if \(J(R)\) is a left \(T\)-module, where \(T\) is a subring of \(R\) generated by its units.