Nonasymptotic and distribution-uniform Koml\'os-Major-Tusn\'ady approximation
Abstract
We present nonasymptotic concentration inequalities for sums of independent and identically distributed random variables that yield asymptotic strong Gaussian approximations of Koml\'os, Major, and Tusn\'ady (KMT) [1975,1976]. The constants appearing in our inequalities are either universal or explicit, and thus as corollaries, they imply distribution-uniform generalizations of the aforementioned KMT approximations. In particular, it is shown that uniform integrability of a random variable's qth moment is both necessary and sufficient for the KMT approximations to hold uniformly at the rate of o(n1/q) for q > 2 and that having a uniformly lower bounded Sakhanenko parameter -- equivalently, a uniformly upper-bounded Bernstein parameter -- is both necessary and sufficient for the KMT approximations to hold uniformly at the rate of O( n). Instantiating these uniform results for a single probability space yields the analogous results of KMT exactly.
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