论文信息 - Optimal Discrete Approximations for Continuous Outcomes with Applications in Decision and Risk Analysis

Optimal Discrete Approximations for Continuous Outcomes with Applications in Decision and Risk Analysis

In decision and risk analysis, it is common to use discrete probability distributions to approximate uncertain events with continuous outcomes. This paper discusses how these approximations may be selected. A class of approximations based on a modification to Taguchi's work on tolerance analysis is shown to be optimal under assumptions of independent uncertainties with normally distributed outcomes. The approximation procedure is shown to be robust in many other situations and is extremely easy to use in practice. We also show how the approximation may be integrated into the process of subjective probability estimation by a ‘subject-matter expert’.

Nicholas A. Jr. Zaino | John D'Errico | John R. D'Errico | N. Zaino

[1] John R. D'Errico,et al. Statistical tolerancing using a modification of Taguchi's method , 1988 .

[2] Charles A. Holloway. Decision Making Under Uncertainty: Models and Choices , 1979 .

[3] H. Thomas,et al. Risk analysis and its applications , 1983 .

[4] Carl-Axel S. Staël von Holstein,et al. Exceptional Paper---Probability Encoding in Decision Analysis , 1975 .

[5] D. Keefer,et al. Three-Point Approximations for Continuous Random Variables , 1983 .

[6] E. S. Pearson,et al. Approximate means and standard deviations based on distances between percentage points of frequency curves , 1965 .

[7] Genichi Taguchi,et al. Performance analysis design , 1978 .