A Gaussian small deviation inequality for convex functions
Abstract
Let Z be an n-dimensional Gaussian vector and let f: Rn R be a convex function. We show that: P ( f(Z) ≤ E f(Z) -t Var f(Z) ) ≤ (-ct2), for all t>1, where c>0 is an absolute constant. As an application we derive variance-sensitive small ball probabilities for Gaussian processes.
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