(weakly) (s,n)-closed hyperideals
Abstract
A multiplicative hyperring is a well-known type of algebraic hyperstructures which extend a ring to a structure in which the addition is an operation but multiplication is a hyperoperation. Let G be a commutative multiplicative hyperring and s,n ∈ Z+. A proper hyperideal Q of G is called (weakly) (s,n)-closed if (0 ≠ as ⊂eq Q) ss ⊂eq Q for a∈ G implies an ⊂eq Q. In this paper, we aim to investigate (weakly) (s,n)-closed hyperideals and give some results explaining the structures of these notions.
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