2015
DOI: 10.1007/s10844-014-0350-3
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An approach to structure determination and estimation of hierarchical Archimedean Copulas and its application to Bayesian classification

Abstract: Copulas are distribution functions with standard uniform univariate marginals. Copulas are widely used for studying dependence among continuously distributed random variables, with applications in finance and quantitative risk management; see, e.g., the pricing of collateralized debt obligations (Hofert and Scherer, Quantitative Finance, 11(5), 775-787, 2011). The ability to model complex dependence structures among variables has recently become increasingly popular in the realm of statistics, one example bei… Show more

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Cited by 39 publications
(48 citation statements)
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“…However note that if Algorithm 1 is transformed to an algorithm for HAC estimation, as, e.g, has been shown in [2], see Section 4 therein, the choice of g becomes essential for the t of the HAC estimates, as is also experimentally shown in the cited article.…”
Section: Discussionmentioning
confidence: 87%
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“…However note that if Algorithm 1 is transformed to an algorithm for HAC estimation, as, e.g, has been shown in [2], see Section 4 therein, the choice of g becomes essential for the t of the HAC estimates, as is also experimentally shown in the cited article.…”
Section: Discussionmentioning
confidence: 87%
“…As has already been outlined in the introduction, kt_kagg merges the structure estimator from [2], which delivers a binary structure, with a collapsing procedure from [14], which, if needed, turns the binary structure to a non-binary one. The binary structure estimator from [2] stems from the approach introduced in [4], see Algorithm 2 therein, which, given a Kendall correlation matrix 1 , applies agglomerative clustering in order to recover the underlying structure. Here, this approach is recalled in Algorithm 1.…”
Section: Structure Determinationmentioning
confidence: 99%
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