关键词: 决策理论粗糙集, 多粒度粗糙集, 梯形模糊数, 覆盖

Abstract: As an extension of the classical Pawlak rough set theory based on the equivalence relation on the universe, in view of the risk decision classification problem, multigranulation decision-theoretic rough sets have been researched by scholars. The main idea aims to select a series of actions, determine probability value of the thresholds of the object classification area, obtain the best decisions of which the overall expected loss function（also called decision-making risk） is as small as possible. However, taking account to the difficulty of getting the equivalence relation in an incomplete information system, the uncertainty of the risk or cost of actions in different states, and the lacking of multigranulation decision-
theoretic rough sets, covering multigranulation trapezoidal fuzzy decision-theoretic rough set models are proposed in this paper. In addition, the average, optimistic and pessimistic covering multigranulation trapezoidal fuzzy decision-theoretic rough set models are investigated respectively. Finally, the relationships between covering multigranulation trapezoidal fuzzy decision-theoretic rough sets and the existing models are discussed. The results obtained and examples illustrate the generality of the models.

Key words: decision-theoretic rough sets, multigranulation rough sets, trapezoidal fuzzy, covering