On a variance dependent Dvoretzky-Kiefer-Wolfowitz inequality
Abstract
Let X be a real-valued random variable with distribution function F. Set X1,…, Xm to be independent copies of X and let Fm be the corresponding empirical distribution function. We show that there are absolute constants c0 and c1 such that if ≥ c0 mm, then with probability at least 1-2(-c1 m), for every t∈R that satisfies F(t)∈[,1-], \[ |Fm(t) - F(t) | ≤ \F(t),1-F(t)\ .\] Moreover, this estimate is optimal up to the multiplicative constants c0 and c1.
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