Riemannian metrics on ℝn and Sobolev-type Inequalities

A. V. Kolesnikov; E. Milman

doi:10.1134/S1064562416050082

Riemannian metrics on ℝⁿ and Sobolev-type Inequalities

A. V. Kolesnikov, E. Milman

Mathematics

Technion - Israel Institute of Technology

Research output: Contribution to journal › Article › peer-review

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.

Original language	Russian
Pages (from-to)	510-513
Number of pages	4
Journal	Doklady Mathematics
Volume	94
Issue number	2
DOIs	https://doi.org/10.1134/S1064562416050082
State	Published - 1 Sep 2016

All Science Journal Classification (ASJC) codes

General Mathematics

Access to Document

10.1134/S1064562416050082

Cite this

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title = "Riemannian metrics on ℝn and Sobolev-type Inequalities",

abstract = "Poincar{\'e}-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.",

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T1 - Riemannian metrics on ℝn and Sobolev-type Inequalities

AU - Kolesnikov, A. V.

AU - Milman, E.

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N2 - 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.

AB - 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.

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DO - 10.1134/S1064562416050082

M3 - مقالة

SN - 1064-5624

VL - 94

SP - 510

EP - 513

JO - Doklady Mathematics

JF - Doklady Mathematics

IS - 2