Given an arbitrary three-dimensional correlation matrix, we prove that there exists a three-dimensional joint distribution for the random variable $(X,Y,Z)$ such that $X$,$Y$ and $Z$ are identically distributed with beta distribution $\beta_{k,k}(dx)$ on $(0,1)$ if $k\geq 1/2$. This implies that any correlation structure can be attained for three-dimensional copulas.
CITATION STYLE
Devroye, L., & Letac, G. (2010). Copulas in three dimensions with prescribed correlations. Arxiv Preprint ArXiv:1004.3146, 1–15. Retrieved from http://arxiv.org/abs/1004.3146
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