Title of article
Probability boxes on totally preordered spaces for multivariate modelling Original Research Article
Author/Authors
Matthias Troffaes، نويسنده , , Sebastien Destercke، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
25
From page
767
To page
791
Abstract
A pair of lower and upper cumulative distribution functions, also called probability box or p-box, is among the most popular models used in imprecise probability theory. They arise naturally in expert elicitation, for instance in cases where bounds are specified on the quantiles of a random variable, or when quantiles are specified only at a finite number of points. Many practical and formal results concerning p-boxes already exist in the literature. In this paper, we provide new efficient tools to construct multivariate p-boxes and develop algorithms to draw inferences from them. For this purpose, we formalise and extend the theory of p-boxes using Walley’s behavioural theory of imprecise probabilities, and heavily rely on its notion of natural extension and existing results about independence modeling. In particular, we allow p-boxes to be defined on arbitrary totally preordered spaces, hence thereby also admitting multivariate p-boxes via probability bounds over any collection of nested sets. We focus on the cases of independence (using the factorization property), and of unknown dependence (using the Fréchet bounds), and we show that our approach extends the probabilistic arithmetic of Williamson and Downs. Two design problems—a damped oscillator, and a river dike—demonstrate the practical feasibility of our results.
Keywords
Lower prevision , p-Box , multivariate , Choquet integral , Fréchet bounds , Full components
Journal title
International Journal of Approximate Reasoning
Serial Year
2011
Journal title
International Journal of Approximate Reasoning
Record number
1183005
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