系统工程理论与实践
繫統工程理論與實踐
계통공정이론여실천
Systems Engineering—Theory & Practice
2012年
1期
139~145
,共null页
拟阵 准拟阵合作对策 τ值
擬陣 準擬陣閤作對策 τ值
의진 준의진합작대책 τ치
matroids; strictly cooperative games on matroids; τ value
考虑合作对策中联盟结构受到拟阵限制的情形,探讨准拟阵合作分配的理性和公平原则的公理化.利用经典合作对策τ值思想,构造了准拟阵合作对策τ值,并证明其满足理性和公平原则.最后将该方法与拟阵合作对策Shapley值在个体理性方面做了比较.
攷慮閤作對策中聯盟結構受到擬陣限製的情形,探討準擬陣閤作分配的理性和公平原則的公理化.利用經典閤作對策τ值思想,構造瞭準擬陣閤作對策τ值,併證明其滿足理性和公平原則.最後將該方法與擬陣閤作對策Shapley值在箇體理性方麵做瞭比較.
고필합작대책중련맹결구수도의진한제적정형,탐토준의진합작분배적이성화공평원칙적공이화.이용경전합작대책τ치사상,구조료준의진합작대책τ치,병증명기만족이성화공평원칙.최후장해방법여의진합작대책Shapley치재개체이성방면주료비교.
As for coalition structure being strict to matroids, two distribution principles of rationality and equality were designed for strictly cooperative games on matroids. Moreover, τ value for strictly cooperative games on matroids was constructed according to τ value for the typical cooperative games, which is characterized by two distribution principles of rationality and equality with the help of strictly mathematic reasoning. Finally, the τ- value compared with Shapley value for cooperative games on matroids in personal rationality.
