Fractional smoothness of images of logarithmically concave measures under polynomials
Abstract
We show that a measure on the real line that is the image of a log-concave measure under a polynomial of degree d possesses a density from the Nikol'skii--Besov class of fractional order 1/d. This result is used to prove an estimate of the total variation distance between such measures in terms of the Fortet--Mourier distance.
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