The optimal sub-Gaussian normalisation for randomised monotone functions
Abstract
Let M denote the class of randomised monotone functions on R with values in [0,1], and let UM R+ R+ be the minimal function for which P\ ηf\, t∈R | fZ(t) - fZ(t) | UM(ηf) \ 2-22 holds for every member fZ of M with finite effective sample size ηf and every positive . We prove that for every x> 1, | UM(x) - 4 x | 2 \!\ 1,\, 2 ( + x) x \\,. The optimal adjustment UM(x) matches 12 2 x for all x>1, with residuals bounded as above.
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