The upgrade of all kinds of algebraic structures has been emphasized with the development of fuzzy mathematics.The concept of hypergroup was raised first by Prof.LI Hong_xing in [1]and HX ring was done in [2].In thi...The upgrade of all kinds of algebraic structures has been emphasized with the development of fuzzy mathematics.The concept of hypergroup was raised first by Prof.LI Hong_xing in [1]and HX ring was done in [2].In this paper ,some properties of power ring and quasi_quotient ring are further studied based on paper [3~6].Especially,several theorems of homomorphism and isomorphism of regular power ring are established.展开更多
On the basis of concepts of bipolar fuzzy sets, we establish a new framework of bipolar fuzzy subsemirings(resp., ideals) which is a generalization of traditional fuzzy subsemirings(resp., ideals) in semirings. Th...On the basis of concepts of bipolar fuzzy sets, we establish a new framework of bipolar fuzzy subsemirings(resp., ideals) which is a generalization of traditional fuzzy subsemirings(resp., ideals) in semirings. The concepts of bipolar fuzzy subsemirings(resp., ideals) are introduced and related properties are investigated by means of positive t-cut, negative s-cut and equivalence relation. Particularly, the notion of a normal bipolar fuzzy ideal is given, and some basic properties are studied in this paper.展开更多
文摘The upgrade of all kinds of algebraic structures has been emphasized with the development of fuzzy mathematics.The concept of hypergroup was raised first by Prof.LI Hong_xing in [1]and HX ring was done in [2].In this paper ,some properties of power ring and quasi_quotient ring are further studied based on paper [3~6].Especially,several theorems of homomorphism and isomorphism of regular power ring are established.
基金Supported by the National Natural Science Foundation of China (Grant No.11071151)
文摘On the basis of concepts of bipolar fuzzy sets, we establish a new framework of bipolar fuzzy subsemirings(resp., ideals) which is a generalization of traditional fuzzy subsemirings(resp., ideals) in semirings. The concepts of bipolar fuzzy subsemirings(resp., ideals) are introduced and related properties are investigated by means of positive t-cut, negative s-cut and equivalence relation. Particularly, the notion of a normal bipolar fuzzy ideal is given, and some basic properties are studied in this paper.
