Abstract
We say that $${\mathcal{A}}$$ is a ring with duality for simple modules, or simply a DSM-ring, if, for every simple right (left) $${\mathcal{A}}$$ -module U, the dual module U* is a simple left (right) $${\mathcal{A}}$$ -module. We prove that a semiperfect ring is a DSM-ring if and only if it admits a Nakayama permutation. We introduce the notion of a monomial ideal of a semiperfect ring and study the structure of hereditary semiperfect rings with monomial ideals. We consider perfect rings with monomial socles.
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