Moments of the Cram\'er transform of log-concave probability measures
Abstract
Let μ be a centered log-concave probability measure on Rn and let μ denote the Cram\'er transform of μ, i.e. μ(x)=\ x,-μ():∈Rn\ where μ is the logarithmic Laplace transform of μ. We show that Eμ[(c1nμ )]<∞ where c1>0 is an absolute constant. In, particular, μ has finite moments of all orders. The proof, which is based on the comparison of certain families of convex bodies associated with μ, implies that \|μ\|L2(μ)≤slant c2n n. The example of the uniform measure on the Euclidean ball shows that this estimate is optimal with respect to n as the dimension n grows to infinity.
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