成对比较
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成对比较(英語:Pairwise comparison)用于确定两件事之间哪个更好,对于每个可能的对象做比对。在某些情况下,两者可能同样好。成对比较用于研究偏好。
总览
每当在两件事之间表达偏好时,就可以进行成对比较。 如果例如两个选择分别是x和y ,以下这三个成对比较是可能的:
x优于y :“ x>y" 或 "xPy"
y优于x:“ y>x" 或 "yPx"
x和y一样好:“ x=y“ 或 "xIy"
传递性
对于给定的决策代理,传递性规则如下:
如果xPy并且满足yPz,则xPz
如果xPy并且满足yIz,则xPz
如果xIy并且满足yPz,则xPz
如果xIy并且满足yIz,则xIz
优先顺序
例如,如果有三个选择a , b和c ,然后有十三种可能的优先顺序 (可能的个人喜好):
應用
成對比較的一個重要應用是受到廣泛使用的層級分析法,這種方法將複雜的問題系統化,幫助人們處理複雜的決策。它使用有形和無形因素的成對比較來構建可幫助決策的比率量表[1][2]
参见
参考文献
- ^ Saaty, Thomas L. Decision Making for Leaders: The Analytic Hierarchy Process for Decisions in a Complex World. Pittsburgh, Pennsylvania: RWS Publications. 1999-05-01. ISBN 978-0-9620317-8-6.
- ^ Saaty, Thomas L. Relative Measurement and its Generalization in Decision Making: Why Pairwise Comparisons are Central in Mathematics for the Measurement of Intangible Factors – The Analytic Hierarchy/Network Process (PDF). Review of the Royal Academy of Exact, Physical and Natural Sciences, Series A: Mathematics (RACSAM). June 2008, 102 (2): 251–318 [2008-12-22]. doi:10.1007/bf03191825. (原始内容 (PDF)存档于2009-11-23).
- Sloane, N.J.A. (ed.). "Sequence A000142 (Factorial numbers)". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- Sloane, N.J.A. (ed.). "Sequence A000670 (Number of preferential arrangements of n labeled elements)". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- Y. Chevaleyre, P.E. Dunne, U. Endriss, J. Lang, M. Lemaître, N. Maudet, J. Padget, S. Phelps, J.A. Rodríguez-Aguilar, and P. Sousa. Issues in Multiagent Resource Allocation. Informatica, 30:3–31, 2006.
延伸阅读
- Bradley, R.A. and Terry, M.E. (1952). Rank analysis of incomplete block designs, I. the method of paired comparisons. Biometrika, 39, 324–345.
- David, H.A. (1988). The Method of Paired Comparisons. New York: Oxford University Press.
- Luce, R.D. (1959). Individual Choice Behaviours: A Theoretical Analysis. New York: J. Wiley.
- Thurstone, L.L. (1927). A law of comparative judgement. Psychological Review, 34, 278–286.
- Thurstone, L.L. (1929). The Measurement of Psychological Value. In T.V. Smith and W.K. Wright (Eds.), Essays in Philosophy by Seventeen Doctors of Philosophy of the University of Chicago. Chicago: Open Court.
- Thurstone, L.L. (1959). The Measurement of Values. Chicago: The University of Chicago Press.
- Zermelo, E. (1928). Die Berechnung der Turnier-Ergebnisse als ein Maximumproblem der Wahrscheinlichkeitsrechnung, Mathematische Zeitschrift 29, 1929, S. 436–460