Rogers-Shephard and local Loomis-Whitney type inequalities
From MaRDI portal
Publication:2314807
DOI10.1007/s00208-019-01834-3zbMath1423.52010arXiv1706.01499OpenAlexW2963969211MaRDI QIDQ2314807
David Alonso-Gutiérrez, Bernardo González Merino, Rafael Villa, Carlos Hugo Jiménez, Shiri Artstein-Avidan
Publication date: 30 July 2019
Published in: Mathematische Annalen (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1706.01499
Related Items (22)
A note on the reduction of the slicing problem to centrally symmetric convex bodies ⋮ On the framework of \(L_p\) summations for functions ⋮ General measure extensions of projection bodies ⋮ On Rogers–Shephard-type inequalities for the lattice point enumerator ⋮ Projection body and isoperimetric inequalities for \(s\)-concave functions ⋮ Functional geominimal surface area and its related affine isoperimetric inequality ⋮ On the volume of the Minkowski sum of zonoids ⋮ On a generalization of the Hermite-Hadamard inequality and applications in convex geometry ⋮ Zhang’s Inequality for Log-Concave Functions ⋮ On mixed quermassintegral for log-concave functions ⋮ Reverse Brascamp-Lieb inequality and the dual Bollobás-Thomason inequality ⋮ A Grassmannian Loomis–Whitney inequality and its dual ⋮ Further inequalities for the (generalized) Wills functional ⋮ Estimating the average of functions with convexity properties by means of a new center ⋮ An extension of Berwald's inequality and its relation to Zhang's inequality ⋮ Rogers-Shephard type inequalities for sections ⋮ On the reverse dual Loomis-Whitney inequality ⋮ Best approximation of functions by log-polynomials ⋮ The functional inequality for the mixed quermassintegral ⋮ Wulff shapes and a characterization of simplices via a Bezout type inequality ⋮ On affine invariant and local Loomis–Whitney type inequalities ⋮ Geometry of log-concave functions: the \(L_p\) Asplund sum and the \(L_p\) Minkowski problem
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Rogers-Shephard inequality for log-concave functions
- Brunn-Minkowski and Zhang inequalities for convolution bodies
- Functional affine-isoperimetry and an inverse logarithmic Sobolev inequality
- On the reverse Loomis-Whitney inequality
- On Godbersen's conjecture
- The difference body of a convex body
- A simple proof of the Poincaré inequality for a large class of probability measures
- Some inequalities about mixed volumes
- Isoperimetric and analytic inequalities for log-concave probability measures
- The affine Sobolev inequality.
- John's ellipsoid and the integral ratio of a log-concave function
- Uniform cover inequalities for the volume of coordinate sections and projections of convex bodies
- Minkowski valuations on convex functions
- Some functional forms of Blaschke-Santaló inequality
- Shadow systems of convex sets
- Forward and reverse entropy power inequalities in convex geometry
- Quermassintegrals of quasi-concave functions and generalized Prékopa-Leindler inequalities
- Geometry of log-concave functions and measures
- Verallgemeinerung eines Mittelwertsatzes von J. Favard für positive konkave Funktionen
- On the Problem of Reversibility of the Entropy Power Inequality
- On a Linear Refinement of the Prékopa-Leindler Inequality
- Convex Bodies Associated with a Given Convex Body
- Functional Inequalities related to the Rogers‐Shephard Inequality
- A Volume Inequality Concerning Sections of Convex Sets
- On a local version of the Aleksandrov-Fenchel inequality for the quermassintegrals of a convex body
- Bezout Inequality for Mixed Volumes
- Correspondences between convex geometry and complex geometry
- Projections of Bodies and Hereditary Properties of Hypergraphs
- Estimating volume and surface area of a convex body via its projections or sections
- The Entropy Per Coordinate of a Random Vector is Highly Constrained Under Convexity Conditions
- Convex Bodies The Brunn-MinkowskiTheory
- The Santaló point of a function, and a functional form of the Santaló inequality
- An inequality related to the isoperimetric inequality
This page was built for publication: Rogers-Shephard and local Loomis-Whitney type inequalities
