Push forward measures and concentration phenomena

Abstract

In this note we study how a concentration phenomenon can be transmitted from one measure μ to a push-forward measure . In the first part, we push forward μ by π:supp(μ)→ , where π x=xxLxK, and obtain a concentration inequality in terms of the medians of the given norms (with respect to μ) and the Banach-Mazur distance between them. This approach is finer than simply bounding the concentration of the push forward measure in terms of the Banach-Mazur distance between K and L. As a corollary we show that any normed probability space with good concentration is far from any high dimensional subspace of the cube. In the second part, two measures μ and are given, both related to the norm ·L, obtaining a concentration inequality in which it is involved the Banach-Mazur distance between K and L and the Lipschitz constant of the map that pushes forward μ into . As an application, we obtain a concentration inequality for the cross polytope with respect to the normalized Lebesgue measure and the 1 norm.