This paper studies the relationship between rough set algebra and non-classical logic algebra, and applys rough set theory to MV-algebra and R0-algebra. The roughness of filter is studied.
本文研究粗糙集代数与非经典逻辑代数的关系,将粗糙集理论应用于MV-代数和R0-代数,讨论其滤子的粗糙性并研究同态映射之下滤子的性质。
参考来源 - 非经典逻辑代数的粗糙性研究·2,447,543篇论文数据,部分数据来源于NoteExpress
粗糙集代数关系的图结构分析是粗糙集理论中又一研究方向。
The graphic structure analysis for algebraic relationship of rough sets is a new research direction of the rough set theory.
这些结果将粗糙集代数性质的研究扩展到右对合广群这个代数系统中。
Through these studies, the study of rough set's algebraic properties are spreaded to right involution groupoid.
在此基础上定义了模糊粗糙集代数,并讨论了模糊粗糙集代数的简单性质。
Based on this, the fuzzy rough set algebra is defined, and some simple properties of the fuzzy rough set algebra are discussed.
应用推荐