Multivariate countermonotonicity and the minimal copulas
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摘要
Fréchet–Hoeffding upper and lower bounds play an important role in various bivariate optimization problems because they are the maximum and minimum of bivariate copulas in concordance order, respectively. However, while the Fréchet–Hoeffding upper bound is the maximum of any multivariate copulas, there is no minimum copula available for dimensions d≥3. Therefore, multivariate minimization problems with respect to a copula are not straightforward as the corresponding maximization problems. When the minimum copula is absent, minimal copulas are useful for multivariate minimization problems. We illustrate the motivation of generalizing the joint mixability to d-countermonotonicity defined in Lee and Ahn (2014) through variance minimization problems and show that d-countermonotonic copulas are minimal copulas.
论文关键词:C100,Countermonotonicity,Comonotonicity,Minimal copula,Variance minimization
论文评审过程:Received 4 February 2016, Revised 7 November 2016, Available online 28 December 2016, Version of Record 9 January 2017.
论文官网地址:https://doi.org/10.1016/j.cam.2016.12.032