Abraham Wald's complete class theorem and Knightian uncertainty
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Publication:2013376
DOI10.1016/j.geb.2017.06.012zbMath1393.91040OpenAlexW3122617812MaRDI QIDQ2013376
Publication date: 17 August 2017
Published in: Games and Economic Behavior (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.geb.2017.06.012
Related Items
Randomization and dynamic consistency ⋮ Dynamic semi-consistency ⋮ Mixed strategies and preference for randomization in games with ambiguity averse agents ⋮ Analysis of information feedback and selfconfirming equilibrium ⋮ Hedging, ambiguity, and the reversal of order axiom
Cites Work
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- Randomization and dynamic consistency
- Analysis of information feedback and selfconfirming equilibrium
- Mixed extensions of decision problems under uncertainty
- Reinterpreting mixed strategy equilibria: a unification of the classical and Bayesian views
- Testable implications of subjective expected utility theory
- Randomization devices and the elicitation of ambiguity-averse preferences
- Maxmin expected utility with non-unique prior
- Recent developments in modeling preferences: Uncertainty and ambiguity
- Choice theory when agents can randomize
- Ambiguity and robust statistics
- Games with randomly disturbed payoffs: a new rationale for mixed-strategy equilibrium points
- Statistical decision functions which minimize the maximum risk
- Risk, Ambiguity, and the Savage Axioms
- Rationalizable Strategic Behavior and the Problem of Perfection
- Ambiguity and Second-Order Belief
- "Preference Reversal" and the Observability of Preferences by Experimental Methods
- Epistemic Conditions for Nash Equilibrium
- Ambiguity Aversion, Robustness, and the Variational Representation of Preferences
- A Smooth Model of Decision Making under Ambiguity
- Ellsberg Revisited: An Experimental Study
- Some Thoughts on the Minimax Principle
- A Definition of Subjective Probability
- An Essentially Complete Class of Admissible Decision Functions
- Stochastically independent randomization and uncertain aversion
