On the structure of marginals in high dimensions
Abstract
Let G, G1,…,GN be independent copies of a standard gaussian random vector in Rd and denote by = Σi=1N Gi,· ei the standard gaussian ensemble. We show that, for any set A⊂ Sd-1, with exponentially high probability, \[ x∈ A 1NΣi=1N | ( x)i - qi| c E x∈ A G,x + 2N N . \] Here each qi is the iN+1-quantile of the standard normal distribution and ( x) denotes the monotone increasing rearrangement of the vector x. The estimate is sharp up to a possible logarithmic factor and significantly extends previously known bounds. Moreover, we show that similar estimates hold in much greater generality: after replacing the gaussian quantiles by the appropriate ones, the same phenomenon persists for a broad class of random vectors.
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