A functional Hungarian construction for sums of independent random variables
Abstract
We develop a Hungarian construction for the partial sum process of independent non-identically distributed random variables. The process is indexed by functions f from a class H, but the supremum over f∈ H is taken outside the probability. This form is a prerequisite for the Koml\'os-Major-Tusn\'ady inequality in the space of bounded functionals l∞ (H), but contrary to the latter it essentially preserves the classical n-1/2 n approximation rate over large functional classes H such as the H\"older ball of smoothness 1/2. This specific form of a strong approximation is useful for proving asymptotic equivalence of statistical experiments.
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