| 1. | Fuzzifying topological linear space
不分明化拓扑线性空间 |
| 2. | Fuzzifying topological linear spaces based on continuous - valued logic
基于连续值逻辑上的不分明化拓扑线性空间 |
| 3. | The generalization of kuratowski fourteen sets theorem in l - fuzzifying topological spaces
不分明化拓扑中的推广 |
| 4. | Fuzzifying convex sets
不分明化凸集 |
| 5. | One night eli , whose eyes were becoming so weak that he could barely see , was lying down in his usual place
2一日,以利睡卧在自己的地方。他眼目昏花,看不分明。 |
| 6. | In this paper , we introduce the concept of fuzzifying rings based on continuous valued logic and ivestigate some of the their algebraic properties
给出基于连续值逻辑上的不分明化环的概念,从一个新的方向讨论了环的某些代数性质。 |
| 7. | Abstract : in this paper , we introduce the concept of fuzzifying rings based on continuous valued logic and ivestigate some of the their algebraic properties
文摘:给出基于连续值逻辑上的不分明化环的概念,从一个新的方向讨论了环的某些代数性质。 |
| 8. | Niv ) nothing in all creation is hidden from god ' s sight . everything is uncovered and laid bare before the eyes of him to whom we must give account
新旧库)并且被造之物,没有一样在?面前是不分明的;原来万物在那与我们有关系的主眼前都是赤露敞开的。 |
| 9. | In this paper , we define the concepts of fuzzifying subalgebras , fuzzifying ideals , and fuzzifying implicative ideals in bck - algebras and discuss their properties and relations among them
在bck -代数中定义了不分明化子代数和不分明化理想的概念,讨论了它们的性质及彼此间的关系。 |
| 10. | Rough set theory make use of the upper approximation and lower approximation made from indicernablity to describe it . these approximations are corresponded with the maximum set belonging to the given classification and the minimum set belonging to the given classification respectively
Rough集就用不分明类形成的上近似和下近似来描述,这些近似分别对应了确定属于给定类的最大对象集合和可能属于给定类的最小的对象集合。 |
