Multivariate distributions with fixed marginals and correlations

Abstract

Consider the problem of drawing random variates (X1,…,Xn) from a distribution where the marginal of each Xi is specified, as well as the correlation between every pair Xi and Xj. For given marginals, the Fr\'echet-Hoeffding bounds put a lower and upper bound on the correlation between Xi and Xj. Any achievable correlation between Xi and Xj is a convex combinations of these bounds. The value λ(Xi,Xj) ∈ [0,1] of this convex combination is called here the convexity parameter of (Xi,Xj), with λ(Xi,Xj) = 1 corresponding to the upper bound and maximal correlation. For given marginal distributions functions F1,…,Fn of (X1,…,Xn) we show that λ(Xi,Xj) = λij if and only if there exist symmetric Bernoulli random variables (B1,…,Bn) (that is \0,1\ random variables with mean 1/2) such that λ(Bi,Bj) = λij. In addition, we characterize completely the set of convexity parameters for symmetric Bernoulli marginals in two, three and four dimensions.