A Boundedly Rational Decision-Making Model Based on Weakly Consistent Preference Relations
Abstract
:1. Introduction
2. Strongly and Weakly Consistent Preferences
3. Boundedly Rational Choices Based on Strongly and Weakly Consistent Preferences
- (1)
- The DM is unable to perceive alternatives.
- (2)
- The DM is unable to rank all alternatives.
- (3)
- The DM chooses the alternative still according to the “optimization” principle within bounds of perceptibility and decidability.
3.1. Choice Function and Conditions of Rationality
- (1)
- Availability: .
- (2)
- Decisiveness: .
3.2. The Relationship between Choice Function and Conditions of Rationality
4. An Example of the Choices of Chocolates Combined with Interval Ordinal Numbers
5. Conclusions
Author Contributions
Funding
Institutional Review Board Statement
Informed Consent Statement
Data Availability Statement
Acknowledgments
Conflicts of Interest
References
- Samuelson, P. A note on the pure theory of consumer’s behaviour. Economica 1938, 5, 61–71. [Google Scholar] [CrossRef]
- Arrow, K.J. Rational choice functions and orderings. Economica 1959, 26, 121–127. [Google Scholar] [CrossRef]
- Richter, M. Revealed preference theory. Econometrica 1966, 34, 635–645. [Google Scholar] [CrossRef]
- Sen, A.K. Choice functions and revealed preference. Rev. Econ. Stud. 1971, 38, 307–317. [Google Scholar] [CrossRef]
- Lichtenstein, S.; Slovic, P. Reversals of preference between bids and choice in gambling decisions. J. Exp. Psychol. 1971, 89, 46–55. [Google Scholar] [CrossRef] [Green Version]
- Kahneman, D.; Tversky, A. Prospect theory: An analysis of decision making under risk. Econometrica 1979, 47, 263–291. [Google Scholar] [CrossRef] [Green Version]
- Simon, H.A. A behavioral model of rational choice. Q. J. Econ. 1955, 69, 99–118. [Google Scholar] [CrossRef]
- Bewley, T.F. Knightian decision theory. Part I. Decis. Econ. Financ. 2002, 25, 79–110. [Google Scholar] [CrossRef]
- Faro, J.H. Variational Bewley preferences. J. Econ. Theory 2015, 157, 699–729. [Google Scholar] [CrossRef] [Green Version]
- Barokas, G. A taxonomy of rationalization by incomplete preferences. Econ. Lett. 2017, 159, 138–141. [Google Scholar] [CrossRef]
- Cettolin, E.; Riedl, A. Revealed preferences under uncertainty: Incomplete preferences and preferences for randomization. J. Econ. Theory 2019, 181, 547–585. [Google Scholar] [CrossRef]
- Gerasimou, G. Partially dominant choice. Econ. Theory 2016, 61, 127–145. [Google Scholar] [CrossRef] [Green Version]
- Qin, D. Partially dominant choice with transitive preferences. Econ. Theory Bull. 2017, 5, 191–198. [Google Scholar] [CrossRef]
- Gerasimou, G. On the indifference relation in Bewley preferences. Econ. Lett. 2018, 164, 24–26. [Google Scholar] [CrossRef] [Green Version]
- Ok, E.A.; Ortoleva, P.; Riella, G. Revealed (P)reference theory. Am. Econ. Rev. 2015, 105, 299–321. [Google Scholar] [CrossRef] [Green Version]
- García-Sanz, M.D.; Alcantud, J. Sequential rationalization of multivalued choice. Math. Soc. Sci. 2015, 74, 29–33. [Google Scholar] [CrossRef] [Green Version]
- Cantone, D.; Giarlotta, A.; Greco, S.; Watson, S. (m, n)-rationalizable choices. J. Math. Psychol. 2016, 73, 12–27. [Google Scholar] [CrossRef] [Green Version]
- Pal, D. Rationalizability of choice functions: Domain Conditions. Econ. Bull. 2017, 37, 1911–1917. [Google Scholar] [CrossRef]
- Armouti-Hansen, J.; Kops, C. This or that? Sequential rationalization of indecisive choice behaviour. Theory Decis. 2018, 84, 507–524. [Google Scholar] [CrossRef]
- Yang, Y.Y. Rationalizable choice functions. Games Econ. Behav. 2020, 123, 120–126. [Google Scholar] [CrossRef]
- Tyson, C.J. Cognitive constraints, contraction consistency, and the satisficing criterion. J. Econ. Theory 2008, 138, 51–70. [Google Scholar] [CrossRef] [Green Version]
- Tyson, C.J. Rationalizability of menu preferences. Econ. Theory 2018, 65, 917–934. [Google Scholar] [CrossRef] [Green Version]
- Cerreia-Vioglio, S.; Giarlotta, A.; Greco, S.; Maccheroni, F.; Marinacci, M. Rational preference and rationalizable choice. Econ. Theory 2020, 69, 61–105. [Google Scholar] [CrossRef] [Green Version]
- Stewart, R.T. Weak pseudo-rationalizability. Math. Soc. Sci. 2020, 104, 23–28. [Google Scholar] [CrossRef] [Green Version]
- Stewart, R.T. A hyper-relation characterization of weak pseudo-rationalizability. J. Math. Psychol. 2020, 99, 102439. [Google Scholar] [CrossRef]
- Haynes, G.A. Testing the boundaries of the choice overload phenomenon: The effect of number of options and time pressure on decision difficulty and satisfaction. Psychol. Mark. 2009, 26, 204–212. [Google Scholar] [CrossRef]
- Iyengar, S.S.; Lepper, M.R. When choice is demotivating: Can one desire too much of a good thing? J. Personal. Soc. Psychol. 2000, 79, 995–1006. [Google Scholar] [CrossRef]
- Kahneman, D. A perspective on judgment and choice: Mapping bounded rationality. Am. Psychol. 2003, 58, 697–720. [Google Scholar] [CrossRef] [Green Version]
- Arrow, K.J. Is bounded rationality unboundedly rational? Some ruminations. In Models of a Man: Essays in Memory of Simon H A; Augier, M., March, J.G., Eds.; MIT Press: Cambridge, MA, USA, 2004. [Google Scholar]
- Gigerenzer, G. Moral satisficing: Rethinking moral behavior as bounded rationality. Top. Cogn. Sci. 2010, 2, 528–554. [Google Scholar] [CrossRef] [Green Version]
- Rubinstein, A. Modelling Bounded Rationality; MIT Press: Cambridge, MA, USA, 1998. [Google Scholar]
- Zhao, Y.; Wu, X.L. Retracted: Intrinsic preferences, revealed preferences and bounded rational decisions. Syst. Res. Behav. Sci. 2016, 33, 205. [Google Scholar]
- Zhang, Z.; Kou, X.; Yu, W.; Guo, C. On priority weights and consistency for incomplete hesitant fuzzy preference relations. Knowl.-Based Syst. 2018, 143, 115–126. [Google Scholar] [CrossRef]
- Zhang, Z.; Li, Z.L. Personalized individual semantics-based consistency control and consensus reaching in linguistic group decision making. IEEE Trans. Syst. Man Cybern. Syst. 2022; in press. [Google Scholar] [CrossRef]
- Wang, J.; Rao, C.J.; Goh, M.; Xiao, X.P. Risk assessment of coronary heart disease based on cloud-random forest. Artif. Intell. Rev. 2022; in press. [Google Scholar] [CrossRef]
Properties | Expressions | Properties | Expressions |
---|---|---|---|
Reflexivity | xRx | Transitivity | If xRy and yRz, then xRz |
Irreflexivity | xx | Residual transitivity | If xR0y and yR0z,then xR0z |
Symmetry | If xRy, then yRx | Cross transitivity | If xRy and y R0z (or x R0y and yRz), then xRz |
Asymmetry | If xRy, then yx | Negative transitivity | If xy and yz, then xz |
Acyclicity | If x1 R x2 R x3…R xn, then xnx1 | Completeness | If xy, then yRx |
The Set of Chocolates | v | w | x | y | z | C(∙) | |
---|---|---|---|---|---|---|---|
{wx} | → | [0.4, 0.45] | [0.35, 0.4] | → | → | {w} | 0.4 |
{vx} | [0.25, 0.3] | → | [0.35, 0.4] | → | → | {x} | 0.35 |
{xy} | → | → | [0.35, 0.4] | [0.25, 0.3] | → | {x} | 0.35 |
{xz} | → | → | [0.35, 0.4] | → | [0.25, 0.3] | {x} | 0.35 |
{wxy} | → | [0. 4, 0.55] | [0.3, 0.4] | [0.2, 0.3] | → | {w} | 0.4 |
{wxz} | → | [0. 4, 0.55] | [0.3, 0.4] | → | [0.2, 0. 3] | {w} | 0.4 |
{xyz} | → | → | [0.3, 0.4] | [0.2, 0.35] | [0.2, 0.35] | {xyz} | 0.3 |
{wxyz} | → | [0. 4, 0.6] | [0.25, 0.4] | [0.2, 0.4] | [0.2, 0.35] | {w} | 0.4 |
{vwxy} | [0.2, 0.3] | [0. 4, 0.6] | [0.25, 0.4] | [0.2, 0.4] | → | {w} | 0.4 |
{vwxz} | [0.2, 0.3] | [0. 4, 0.6] | [0.25, 0.4] | → | [0.2, 0.35] | {w} | 0.4 |
{vxyz} | [0.2, 0.3] | → | [0.25, 0.4] | [0.2, 0.4] | [0.2, 0.35] | {vxyz} | 0.25 |
The Set of Chocolates | v | w | x | y | z | C(∙) | |
---|---|---|---|---|---|---|---|
{wx} | → | [0.4, 0.45] | [0.2, 0.3] | → | → | {w} | 0.4 |
{vx} | [0.4, 0.45] | → | [0.2, 0.3] | → | → | {v} | 0.4 |
{xy} | → | → | [0.2, 0.3] | [0.45, 0.5] | → | {y} | 0.45 |
{xz} | → | → | [0.2, 0.3] | → | [0.35, 0.5] | {z} | 0.35 |
{wxy} | → | [0. 4, 0.55] | [0.2, 0.35] | [0.35, 0.5] | → | {wy} | 0.4 |
{wxz} | → | [0. 4, 0.55] | [0.2, 0.35] | → | [0.35, 0.55] | {wz} | 0.4 |
{xyz} | → | → | [0.2, 0.4] | [0.35, 0.5] | [0.35, 0.55] | {xyz} | 0.35 |
{wxyz} | → | [0. 4, 0.6] | [0.15, 0.4] | [0.35, 0.55] | [0.25, 0.55] | {wyz} | 0.4 |
{vwxy} | [0.4, 0.55] | [0. 4, 0.6] | [0.15, 0.4] | [0.35, 0.55] | → | {vwy} | 0.4 |
{vwxz} | [0.4, 0.55] | [0. 4, 0.6] | [0.15, 0.4] | → | [0.25, 0.55] | {vwz} | 0.4 |
{vxyz} | [0.4, 0.6] | → | [0.15, 0.4] | [0.35, 0.55] | [0.25, 0.55] | {vyz} | 0.4 |
Publisher’s Note: MDPI stays neutral with regard to jurisdictional claims in published maps and institutional affiliations. |
© 2022 by the authors. Licensee MDPI, Basel, Switzerland. This article is an open access article distributed under the terms and conditions of the Creative Commons Attribution (CC BY) license (https://creativecommons.org/licenses/by/4.0/).
Share and Cite
Wu, X.; Xiao, H. A Boundedly Rational Decision-Making Model Based on Weakly Consistent Preference Relations. Symmetry 2022, 14, 918. https://doi.org/10.3390/sym14050918
Wu X, Xiao H. A Boundedly Rational Decision-Making Model Based on Weakly Consistent Preference Relations. Symmetry. 2022; 14(5):918. https://doi.org/10.3390/sym14050918
Chicago/Turabian StyleWu, Xinlin, and Haiyan Xiao. 2022. "A Boundedly Rational Decision-Making Model Based on Weakly Consistent Preference Relations" Symmetry 14, no. 5: 918. https://doi.org/10.3390/sym14050918
APA StyleWu, X., & Xiao, H. (2022). A Boundedly Rational Decision-Making Model Based on Weakly Consistent Preference Relations. Symmetry, 14(5), 918. https://doi.org/10.3390/sym14050918