Zhang's inequality for log-concave functions

Zhang's reverse affine isoperimetric inequality states that among all convex bodies $K\subseteq\mathbb{R}^n$, the affine invariant quantity $|K|^{n-1}|\Pi^*(K)|$ (where $\Pi^*(K)$ denotes the polar projection body of $K$) is minimized if and only if $K$ is a simplex. In this paper we prove an e...

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Hauptverfasser:	Alonso-Gutiérrez, David, Bernués, Julio, Merino, Bernardo González
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Functional Analysis Mathematics - Metric Geometry
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Zusammenfassung:	Zhang's reverse affine isoperimetric inequality states that among all convex bodies $K\subseteq\mathbb{R}^n$, the affine invariant quantity $\|K\|^{n-1}\|\Pi^(K)\|$ (where $\Pi^(K)$ denotes the polar projection body of $K$) is minimized if and only if $K$ is a simplex. In this paper we prove an extension of Zhang's inequality in the setting of integrable log-concave functions, characterizing also the equality cases.
DOI:	10.48550/arxiv.1810.07507