Inequalities of correlation type for symmetric stable random vectors
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InequalitiesCorrelationType.pdf (176.5Kb)Abstract
We point out a certain class of functions f and g for which random variables f(X1,...,Xm) and g(Xm+1,...,Xk) are non-negatively correlated for any symmetric jointly stable random variables Xi. We also show another result that is related to the correlation problem for Gaussian measures of symmetric convex sets.