Does the Convex Order Between the Distributions of Linear Functionals Imply the Convex Order Between the Probability Distributions Over Rd?

Abstract

It is shown that the convex order between the distributions of linear functionals does not imply the convex order between the probability distributions over Rd if d2. This stands in contrast with the well-known fact that any probability distribution in Rd, for any d1, is determined by the corresponding distributions of linear functionals. By duality, it follows that, for any d2, not all convex functions from Rd to R can be represented as the limits of sums Σi=1k gi i of convex functions gi of linear functionals i on Rd.

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