Uniform Convergence of the Empirical Distribution Function Over Convex Sets
Uniform Convergence of the Empirical Distribution Function Over Convex Sets
The empirical distribution function $P_n$ converges with probability 1 to a true distribution $P$ in $R^k$, uniformly over measurable convex sets, if and only if $P$ is a countable mixture of distributions, each of which is carried by a flat and gives zero probability to the relative boundaries of convex …