Seminearrings are the generalization of well known algebraic structures such as semirings, nearrings and rings. In the present work, we discuss results on fuzzy ideals and rough sets in seminearrings. Initially, we introduce the notion of fuzzy ideal of a seminearring Formula: see text which is the generalization of fuzzy ideal of a nearring. Then we prove that the level set Formula: see text) is a strong ideal of Formula: see text if and only if the fuzzy set Formula: see text is a fuzzy ideal of Formula: see text Later, we define upper approximations and lower approximations of a subset of a seminearring with respect to the equivalence relations Formula: see text and Formula: see text on Formula: see text induced by strong ideals and equiprime strong ideals respectively. Further, we characterize the relationship among these approximations and are explained with suitable examples.
Srinivas et al. (Fri,) studied this question.