Statistical decisions under ambiguity

Theory and Decision 70 (2):129-148 (2011)
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Abstract

This article provides unified axiomatic foundations for the most common optimality criteria in statistical decision theory. It considers a decision maker who faces a number of possible models of the world (possibly corresponding to true parameter values). Every model generates objective probabilities, and von Neumann–Morgenstern expected utility applies where these obtain, but no probabilities of models are given. This is the classic problem captured by Wald’s (Statistical decision functions, 1950) device of risk functions. In an Anscombe–Aumann environment, I characterize Bayesianism (as a backdrop), the statistical minimax principle, the Hurwicz criterion, minimax regret, and the “Pareto” preference ordering that rationalizes admissibility. Two interesting findings are that c-independence is not crucial in characterizing the minimax principle and that the axiom which picks minimax regret over maximin utility is von Neumann–Morgenstern independence

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10.1007/s11238-010-9227-2

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Citations of this work

Can we make wise decisions to modify ourselves?Rhonda Martens - 2019 - Journal of Ethics and Emerging Technologies 29 (1):1-18.
Minimax and the value of information.Evan Sadler - 2015 - Theory and Decision 78 (4):575-586.

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References found in this work

A Theory of Justice: Revised Edition.John Rawls - 1999 - Harvard University Press.
A Theory of Justice.John Rawls - 1971 - Oxford,: Harvard University Press. Edited by Steven M. Cahn.
The Foundations of Statistics.Leonard Savage - 1954 - Wiley Publications in Statistics.
The Foundations of Statistics.Leonard J. Savage - 1956 - Philosophy of Science 23 (2):166-166.
Maxmin expected utility with non-unique prior.Itzhak Gilboa & David Schmeidler - 1989 - Journal of Mathematical Economics 18 (2):141–53.

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