General measure extensions of projection bodies
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Publication:6075041
DOI10.1112/plms.12477arXiv2106.13212MaRDI QIDQ6075041
Michael Roysdon, Unnamed Author, Artem Zvavitch
Publication date: 20 September 2023
Published in: Proceedings of the London Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2106.13212
Inequalities and extremum problems involving convexity in convex geometry (52A40) Mixed volumes and related topics in convex geometry (52A39)
Related Items (6)
Existence of solution for Lp-Minkowski problem of 0 < p < 1 with measures in ℝn ⋮ Weighted Minkowski’s existence theorem and projection bodies ⋮ Weighted Brunn-Minkowski theory. I: On weighted surface area measures ⋮ \(L_p\) centroid bodies with respect to weights \(|x|^{\ell}\) ⋮ Minkowski symmetrization and projection bodies ⋮ The \(L_p\) John ellipsoids for general measures
Cites Work
- Rogers-Shephard inequality for log-concave functions
- A hyperplane inequality for measures of convex bodies in \(\mathbb R^{n }, \; n\leq 4\)
- The affine Sobolev-Zhang inequality on BV(\(\mathbb R^n)\)
- Maximal surface area of a convex set in \(\mathbb R^n\) with respect to exponential rotation invariant measures
- Maximal surface area of polytopes with respect to log-concave rotation invariant measures
- An example related to the slicing inequality for general measures
- The difference body of a convex body
- Restricted chord projection and affine inequalities
- Gaussian measure of sections of dilates and translations of convex bodies
- Éléments extrémaux pour les inégalités de Brunn-Minkowski gaussiennes (Extreme elements for the Gaussian Brunn-Minkowski inequalities)
- The reverse isoperimetric problem for Gaussian measure
- The Ehrhard inequality
- The affine Sobolev inequality.
- A reverse Rogers-Shephard inequality for log-concave functions
- The Busemann-Petty problem for arbitrary measures
- The dimensional Brunn-Minkowski inequality in Gauss space
- On the Gardner-Zvavitch conjecture: symmetry in inequalities of Brunn-Minkowski type
- Complemented Brunn-Minkowski inequalities and isoperimetry for homogeneous and non-homogeneous measures
- An isomorphic version of the Busemann-Petty problem for arbitrary measures
- Convex set functions in \(d\)-space
- Rogers-Shephard type inequalities for sections
- Rogers-Shephard and local Loomis-Whitney type inequalities
- An extension of Minkowski's theorem and its applications to questions about projections for measures
- A \(\sqrt{n}\) estimate for measures of hyperplane sections of convex bodies
- Slicing inequalities for measures of convex bodies
- Some semicontinuity theorems for convex polytopes and cell-complexes
- Integral inequalities for generalized concave or convex functions
- Verallgemeinerung eines Mittelwertsatzes von J. Favard für positive konkave Funktionen
- A note on a Brunn-Minkowski inequality for the Gaussian measure
- Gaussian Brunn-Minkowski inequalities
- Valuations on function spaces
- Every Convex Function is Locally Lipschitz
- Problems on convex bodies
- Surface Area of a Convex Body Under Affine Transformations
- Symétrisation dans l'espace de Gauss.
- On Rogers–Shephard Type Inequalities for General Measures
- Functional Inequalities related to the Rogers‐Shephard Inequality
- Covariograms Generated by Valuations
- Volume Ratios and a Reverse Isoperimetric Inequality
- Logarithmically concave functions and sections of convex sets in $R^{n}$
- Affine inequalities and radial mean bodies
- Isotropic surface area measures
- A note on the Ehrhard inequality
- Some remarks about the maximal perimeter of convex sets with respect to probability measures
- Measure comparison and distance inequalities for convex bodies
- Zhang’s Inequality for Log-Concave Functions
- The Lower Bound for Koldobsky’s Slicing Inequality via Random Rounding
- Maximal Surface Area of a Convex Set in $$\mathbb{R}^{n}$$ with Respect to Log Concave Rotation Invariant Measures
- Asymptotic Geometric Analysis, Part I
- Convex Bodies The Brunn-MinkowskiTheory
- Optimal Sobolev norms and the Lp Minkowski problem
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