Abstract
We prove that the (B) conjecture and the Gardner–Zvavitch conjecture are true for all log-concave measures that are rotationally invariant, extending previous results known for Gaussian measures. Actually, our result apply beyond the case of log-concave measures, for instance, to Cauchy measures as well. For the proof, new sharp weighted Poincaré inequalities are obtained for even probability measures that are log-concave with respect to a rotationally invariant measure.
Funding Statement
The second author is partially supported by ISF Grant 1468/19 and BSF Grant 2016050.
Citation
Dario Cordero-Erausquin. Liran Rotem. "Improved log-concavity for rotationally invariant measures of symmetric convex sets." Ann. Probab. 51 (3) 987 - 1003, May 2023. https://doi.org/10.1214/22-AOP1604
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