A note on injectivity of monomial algebras

Abstract: We show that a monomial algebra $\Lambda$ over an algebraically closed field $K$ is self-injective if and only if each map $\mathrm{soc}({\Lambda}\Lambda)\to \ _{\Lambda}\Lambda$ can be extended to an endomorphism of ${\Lambda}\Lambda$, and provide a complete classification of such algebras. As a consequence, we show that the class of self-injective monomial algebras is a subclass of Nakayama algebras.