Abstract
Tusnády's inequality is the key ingredient in the KMT/Hungarian coupling of the empirical distribution function with a Brownian bridge. We present an elementary proof of a result that sharpens the Tusnády inequality, modulo constants. Our method uses the beta integral representation of Binomial tails, simple Taylor expansion and some novel bounds for the ratios of normal tail probabilities. © Institute of Mathematical Statistics, 2004.
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APA
Carter, A., & Pollard, D. (2004). Tusnády’s inequality revisited. Annals of Statistics, 32(6), 2731–2741. https://doi.org/10.1214/009053604000000733
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