\( \delta \)-primary subhypermodules on Krasner hyperrings (Q6600775)

In hyperstructures, the hyperoperation assigns more than one element to a member of another set. This paper deals with the theory of \(\delta\)-primary subhypermodules in the context of commutative Krasner hyperrings with nonzero identity. Note that the concepts hyperrings and hypermodules generalize classical ring and module concepts using the hyperoperations.\N\NThe concept of \(\delta\)-primary subhypermodules extends the classical notion of prime and primary ideals in algebra. The authors focus on hypermodules over Krasner hyperrings, exploring how the expansion function \(\delta\) influences submodule behavior. In fact, some characterizations and properties for \(\delta\)-primary subhypermodules using the expansion function \(\delta\) are proved.