Rearrangements of distributions on integers that minimize variance
Abstract
Which permutations of a probability distribution on integers minimize variance? Let X be a random variable on a set of integers \x1, …, xN\ such that P(Xi = xi) = pi, i ∈ \1,…,N\. Let (p(1), …, p(N)) be the sequence (p1, …, pN) ordered non-increasingly. Let X+ be the random variable defined by P(X+=0)=p(1), P(X+=1) = p(2), P(X+=-1)=p(3), …, P(X+=(-1)N N 2 )=p(N). In this short note we generalize and prove the inequality Var\, X+ Var\, X.
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