Generalization of Pawlak’s Approximations in Hypermodules by Set-Valued Homomorphisms

Abstract: Abstract. The initiation and majority on rough sets for algebraic hyperstructures such as hypermodules over a hyperring have been concentrated on a congruence relation. The congruence relation, however, seems to restrict the application of the generalized rough set model for algebraic sets. In this paper, in order to solve this problem, we consider the concept of set-valued homomorphism for hypermodules and we give some examples of set-valued homomorphism. In this respect, we show that every homomorphism of th… Show more

“…He also investigated the concept of rough approximation spaces of hyperrings in [20]. Miravakili et al [21] studied the concept of roughness in hypermodules by maneuvering set-valued homomorphisms. Furthermore, Leoreanu and Davvaz [22] and Anvariyeh et al [23] applied the notion of Pawalk's rough sets to n−array hypergroups and γ −semihypergroups, respectively.…”

A Study of Roughness in Modules of Fractions

“…He also investigated the concept of rough approximation spaces of hyperrings in [20]. Miravakili et al [21] studied the concept of roughness in hypermodules by maneuvering set-valued homomorphisms. Furthermore, Leoreanu and Davvaz [22] and Anvariyeh et al [23] applied the notion of Pawalk's rough sets to n−array hypergroups and γ −semihypergroups, respectively.…”

A Study of Roughness in Modules of Fractions