JOURNAL OF MATHEMATICAL EXTENSION

The notion of multiplicative hyperrings is an important class of algebraic hyperstructures which generalize rings where the multiplication is a hyperoperation, while the addition is an operation ‎. ‎Let $R$ be a commutative multiplicative hyperring and ‎$‎\alpha \in End(R)‎$‎‎. ‎A proper hyperideal $I$ of $R$ is called ‎$‎\alpha‎$‎-prime if $x \circ y \subseteq I$ for some $x‎, ‎y \in R$ then $x \in I$ or $\alpha(y) \in I$‎. ‎Indeed‎, ‎the $\alpha‎$‎-prime hyperideals are a new generalization of prime hyperideals‎. ‎In this paper‎, ‎we aim to study ‎$‎\alpha‎$‎-prime hyperideals and give the basic properties of this new type of hyperideals‎.