Super-Gaussian directions of random vectors

Abstract

We establish the following universality property in high dimensions: Let X be a random vector with density in Rn. The density function can be arbitrary. We show that there exists a fixed unit vector θ ∈ Rn such that the random variable Y = X, θ satisfies \ P( Y ≥ t M ), P(Y ≤ -tM) \ ≥ c e-C t2 for all \ 0 ≤ t ≤ c n, where M > 0 is any median of |Y|, i.e., \ P( |Y| ≥ M), P( |Y| ≤ M ) \ ≥ 1/2. Here, c, c, C > 0 are universal constants. The dependence on the dimension n is optimal, up to universal constants, improving upon our previous work.