English

运筹学学报 >

2015 , Vol. 19 >Issue 3: 8 - 17

DOI: https://doi.org/10.15960/j.cnki.issn.1007-6093.2015.03.002

运筹学

多数满意陪审团定理的极大和极小概率

展开
  • 1. 南通职业大学基础部, 江苏南通, 226007; 2. 上海大学管理学院, 上海, 200444

收稿日期: 2015-03-16

  网络出版日期: 2015-09-15

收起

Maximal and minimal probabilities of the majority satisfaction jury theorem

Expand
  • 1.Basic Course Department of Nantong Vocational University, Nantong 226007, Jiangsu, China; 2.School of Management, Shanghai University, Shanghai 200444, China

Received date: 2015-03-16

  Online published: 2015-09-15

Fold

摘要

证明了在群体中,当各个体正确判断方案满意性的概率越分散,由多数满意规则确定的相应群体正确判断方案满意性的概率将越大.根据这一结果得到:在所有的个体正确判断方案满意性的平均概率相同的情况下,由多数满意陪审团定理决定的群体正确判断方案满意性的极大概率和极小概率的表达式.

关键词: 群体决策; 满意指标; 多数满意规则; 多数满意陪审团定理

本文引用格式

秦志林, 于丽英 . 多数满意陪审团定理的极大和极小概率[J]. 运筹学学报, 2015 , 19(3) : 8 -17 . DOI: 10.15960/j.cnki.issn.1007-6093.2015.03.002

Abstract

This paper proves that when the probabilities of individuals in the group correctly judging satisfaction of alternatives are more dispersed that corresponding to the group using the majority satisfactory rule will have a higher probability. According to this result, we get the expressions of maximal probability and minimal probability of the group determined by majority satisfaction jury theorem on average probability of all individuals correctly judging satisfaction of alternatives has same.

Key words: group decision making; satisfaction criterion; majority satisfactory rule; majority satisfaction jury theorem

参考文献

Arrow  K J. {Social Choice and Individual Values}[M]. New York: John Wiley Sons,  1963.


Sen  A K.  {Collective Choice and Social Welfare}[M]. Amsterdam:{Elsevier Science} BV,  1995.
Hu  Y D, Cai  H.  Paradox of voting and trial preference set of group decision making [J]. Chinese Science Bulltin, 1998, 43: 550-553.
Mueller  D  C.  {Public Choice III} [M].  Cambridge: Press Syndicate University of Cambridge, 2003.
胡毓达,胡的的. {群体决策--多数规则与投票悖论} [M]. 上海:上海科学技术出版社,2006.
Condorcet  M J  A  N.  Marquis de.  {Essai surl`Application de l`Analyse \'{a} la Probabilit\'{e} des D\'{e}cisions Rendues \'{a} la Pluralit\'{e} des Voix } [M].  Paris: Author, 1785.
胡毓达,洪振杰. 群体决策的多数满意规则及其性质~[J]. {高等数学研究}, 2013,16(4): 1-1.
胡毓达. 多数满意偏好规则的充分必要条件~[J]. { 运筹学学报},2014, 18(4): 78-81.
胡毓达. 多数满意规则的一般陪审团概率及其极限~[J].{ 高等数学研究}, 2015, 18(4): 1-5.

 
Options
文章导航

/