Hyperplane sections of convex bodies in isotropic position.
Concentration inequalities for s-concave measures of dilations of Borel sets and applications.
Thin-shell concentration for convex measures
We prove that for s < 0, s-concave measures on ℝⁿ exhibit thin-shell concentration similar to the log-concave case. This leads to a Berry-Esseen type estimate for most of their one-dimensional marginal distributions. We also establish sharp reverse Hölder inequalities for s-concave measures.
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