Glivenko–Cantelli theorem theory of probability , the Glivenko–Cantelli theorem , named after Valery Ivanovich Glivenko and Francesco Paolo Cantelli , determines the asymptotic behaviour of the empirical distribution function as the number of independent and identically distributed observations grows.Statement The uniform convergence of more general empirical measures becomes an important property of the Glivenko–Cantelli classes of functions or sets. The Glivenko–Cantelli classes arise in Vapnik–Chervonenkis theory , with applications to machine learning . Applications can be found in econometrics making use of M-estimators.independent and identically-distributed random variables in with common cumulative distribution function . The empirical distribution function for is defined byindicator function of the set. For every , is a sequence of random variables which converge to almost surely by the strong law of large numbers , that is, converges to pointwise . Glivenko and Cantelli strengthened this result by proving uniform convergence of to.Theorem Valery Glivenko , and Francesco Cantelli , in 1933 .Remarks continuous random variable . Fix such that for. Now for all there exists such that. Note thatstrong law of large numbers , we can guarantee that for any integer we can find such that for all almost sure convergence .Empirical measures One can generalize the empirical distribution function by replacing the set by an arbitrary set C from a class of sets to obtain an empirical measure indexed by sets f , which is given bylaw of large numbers holds uniformly on or.Glivenko–Cantelli class Consider a set with a sigma algebra of Borel subsets A and a probability measure P . For a class of subsets,Definitions A class is called a Glivenko–Cantelli class with respect to a probability measure P if any of the following equivalent statements is true. A class is called a universal Glivenko–Cantelli class if it is a GC class with respect to any probability measure P on. A class is called uniformly Glivenko–Cantelli if the convergence occurs uniformly over all probability measures P on : Theorem Examples Let and. The classical Glivenko–Cantelli theorem implies that this class is a universal GC class. Furthermore, by Kolmogorov's theorem , Let P be a nonatomic probability measure on S and be a class of all finite subsets in S . Because,,, we have that and so is not a GC class with respect to P .
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