A limit theorem for selectors

Abstract

Any (measurable) function K from Rn to R defines an operator K acting on random variables X by K(X)=K(X1, …, Xn), where the Xj are independent copies of X. The main result of this paper concerns selectors H, continuous functions defined in Rn and such that H(x1, x2, …, xn) ∈ \x1,x2, …, xn\. For each such selector H (except for projections onto a single coordinate) there is a unique point ωH in the interval (0,1) so that for any random variable X the iterates H(N) acting on X converge in distribution as N ∞ to the ωH-quantile of X.