Email this article Riemannian metrics on ℝn and Sobolev-type Inequalities
- Authors: Kolesnikov A.V.1, Milman E.2
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Affiliations:
- Higher School of Economics (National Research University)
- Israel Institute of Technology (Technion)
- Issue: Vol 94, No 2 (2016)
- Pages: 510-513
- Section: Mathematics
- URL: https://journals.rcsi.science/1064-5624/article/view/224220
- DOI: https://doi.org/10.1134/S1064562416050082
- ID: 224220
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Abstract
Poincaré-type estimates for a logarithmically concave measure μ on a convex set Ω are obtained. For this purpose, Ω is endowed with a Riemannian metric g in which the Riemannian manifold with measure (Ω, g, μ) has nonnegative Bakry–Emery tensor and, as a corollary, satisfies the Brascamp–Lieb inequality. Several natural classes of metrics (such as Hessian and conformal metrics) are considered; each of these metrics gives new weighted Poincare, Hardy, or log-Sobolev type inequalities and other results.
About the authors
A. V. Kolesnikov
Higher School of Economics (National Research University)
Author for correspondence.
Email: sascha77@mail.ru
Russian Federation, Myasnitskaya ul. 20, Moscow, 101000
E. Milman
Israel Institute of Technology (Technion)
Email: sascha77@mail.ru
Israel, Haifa, 3200003
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