Abstract
The objective of this study is to generalize the roughness of a fuzzy set-in three-dimensional structure by introducing ternary multiplication. Many results and theorems of rough fuzzy ideals have been extended from semigroup and semiring, to ternary semiring by introducing the definition of a rough fuzzy subset of ternary semiring. By using the concept of set-valued homomorphism and strong set-valued homomorphism, it is proved generalized lower and upper approximations of ( ∈ , ∈ ∨ q) -fuzzy ideals (semiprime and prime ideals) of ternary semirings are ( ∈ , ∈ ∨ q) -fuzzy ideals (semiprime and prime ideals) respectively.