Coherent distributions: Hilbert space approach and duality
Abstract
Let X be a Bernoulli random variable with the success probability p. We are interested in tight bounds on E[f(X1,X2)], where Xi=E[X| Fi] and Fi are some sigma-algebras. This problem is closely related to understanding extreme points of the set of coherent distributions. A distribution on [0,1]2 is called coherent if it can be obtained as the joint distribution of (X1, X2) for some choice of Fi. By treating random variables as vectors in a Hilbert space, we establish an upper bound for quadratic f, characterize f for which this bound is tight, and show that such f result in exposed coherent distributions with arbitrarily large support. As a corollary, we get a tight bound on cov\,(X1,X2) for p∈ [1/3,\,2/3]. To obtain a tight bound on cov\,(X1,X2) for all p, we develop an approach based on linear programming duality. Its generality is illustrated by tight bounds on E[|X1-X2|α] for any α>0 and p=1/2.
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