Mechanical Engineering in Uncertainties From Classical Approaches to Some Recent Developments. Группа авторов

Mechanical Engineering in Uncertainties From Classical Approaches to Some Recent Developments - Группа авторов


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       – the interval between two points with a possibility α corresponds to an α-cut and represents the subset with a possibility at least equal to α. There is no equivalent meaning in probability theory.

Graph depicts the probability density function and possibility distribution function satisfying the consistency condition.

      To conclude this comparison, it should be noted that possibility and necessity can be considered as upper and lower bounds of true probability in the presence of epistemic uncertainty. This implies that the cumulative functions of possibility (CPoF) and necessity (CNeF) will bound the cumulative probability distribution function (CDF).

Graph depicts the distribution function (DF), cumulative possibility function (CPoF) and cumulative necessity function.

      1.7.3. Rules for combining possibility distributions

      Possibility theory addresses the problem of quantifying uncertainties when solely based on expert opinion, which will assign likelihood levels to different values of the quantity of interest via possibility distributions Π(x) (typically via triangular or trapezoidal distributions). One of the fundamental questions that then arises is how to deal with divergent expert opinions. For this purpose, different rules for combining possibility distributions have been established.

      Let Π1 and Π2 be two possibility distributions. These distributions can be aggregated according to the following rules:

       – the conjunctive mode: this is the equivalent of the intersection of events. It corresponds to retaining only the consensus (the common area under the two distributions). This consensus is typically renormalized in order to satisfy the possibilistic axioms;

       – the disjunctive mode: this is the equivalent of the union of events. It corresponds to the union of the two distributions;

       – the intermediate mode (proposed by Dubois and Prade 1992): as its name indicates, this is an intermediate mode between the two previous ones. By defining the consensus, that is, the upper possibility bound following the intersection of the two distributions, by h, the distribution of the intermediate mode is defined by:

      [1.19]image

      These three modes of combination usually make it possible to combine distributions of possibility from different sources (experts, for example). If there is good agreement between the sources (for example, trapezoidal distributions with overlapping cores), then either the connective or disjunctive modes are both well suited. The choice between the two depends on whether one wishes to consider only consensus or whether one wishes to integrate divergent views as well.

      The theory of belief functions (or evidence theory) is another theory for modeling uncertainties of an epistemic nature. It was developed by Dempster (1967) and Shafer (1976) and is consequently sometimes known as the Demspter–Shafer theory. This approach is similar in spirit to the probability box theory and possibility theory, in that it seeks to obtain a bounding for a CDF.

      1.8.1.


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