Please use this identifier to cite or link to this item: http://cmuir.cmu.ac.th/jspui/handle/6653943832/54416
Title: Why copulas have been successful in many practical applications: A theoretical explanation based on computational efficiency
Authors: Vladik Kreinovich
Hung T. Nguyen
Songsak Sriboonchitta
Olga Kosheleva
Keywords: Computer Science
Mathematics
Issue Date: 1-Jan-2015
Abstract: © Springer International Publishing Switzerland 2015. A natural way to represent a 1-D probability distribution is to store its cumulative distribution function (cdf) F(x) = Prob(X < x). When several random variables X1,. . ., Xn are independent, the corresponding cdfs F1(x1),. . ., Fn(xn) provide a complete description of their joint distribution. In practice, there is usually some dependence between the variables, so, in addition to the marginals Fi(xi), we also need to provide an additional information about the joint distribution of the given variables. It is possible to represent this joint distribution by a multi-D cdf F(x1,. . ., xn) = Prob(X1 < x1 &. . &Xn < xn), but this will lead to duplication - since marginals can be reconstructed from the joint cdf - and duplication is a waste of computer space. It is therefore desirable to come up with a duplication-free representation which would still allow us to easily reconstruct F(x1,. . ., xn). In this paper, we prove that among all duplication-free representations, the most computationally efficient one is a representation in which marginals are supplements by a copula. This result explains why copulas have been successfully used in many applications of statistics: since the copula representation is, in some reasonable sense, the most computationally efficient way of representing multi-D probability distributions.
URI: https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84951019499&origin=inward
http://cmuir.cmu.ac.th/jspui/handle/6653943832/54416
ISSN: 03029743
Appears in Collections:CMUL: Journal Articles

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