A general slicing inequality for measures of convex bodies
Abstract We consider the following inequality: μ(L)n−kn≤CkmaxH∈Grn−kμ(L∩H), $$\begin{aligned} \mu (L)^{\frac{n-k}{n}} \leq C^{k}\max_{H\in \mathit{Gr}_{n-k}}\mu (L \cap H), \end{aligned}$$ which is a variant of the notable slicing inequality in convex geometry, where L is an origin-symmetric star bo...
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SpringerOpen
2019-05-01
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| Series: | Journal of Inequalities and Applications |
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| Online Access: | http://link.springer.com/article/10.1186/s13660-019-2085-8 |
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doaj-a47c8959e7094e89abcaa20fe237a86d2020-11-25T02:20:55ZengSpringerOpenJournal of Inequalities and Applications1029-242X2019-05-012019111310.1186/s13660-019-2085-8A general slicing inequality for measures of convex bodiesYufeng Yu0School of Mathematics and Computer Science, Shanxi Normal UniversityAbstract We consider the following inequality: μ(L)n−kn≤CkmaxH∈Grn−kμ(L∩H), $$\begin{aligned} \mu (L)^{\frac{n-k}{n}} \leq C^{k}\max_{H\in \mathit{Gr}_{n-k}}\mu (L \cap H), \end{aligned}$$ which is a variant of the notable slicing inequality in convex geometry, where L is an origin-symmetric star body in Rn ${{\mathbb{R}}}^{n}$ and is μ-measurable, μ is a nonnegative measure on Rn ${\mathbb{R}} ^{n}$, Grn−k $\mathit{Gr}_{n-k}$ is the Grassmanian of an n−k $n-k$-dimensional subspaces of Rn ${\mathbb{R}}^{n}$, and C is a constant. By constructing the generalized k-intersection body with respect to μ, we get some results on this inequality.http://link.springer.com/article/10.1186/s13660-019-2085-8Convex bodiesIntersection bodiesGeneralized measures |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Yufeng Yu |
| spellingShingle |
Yufeng Yu A general slicing inequality for measures of convex bodies Journal of Inequalities and Applications Convex bodies Intersection bodies Generalized measures |
| author_facet |
Yufeng Yu |
| author_sort |
Yufeng Yu |
| title |
A general slicing inequality for measures of convex bodies |
| title_short |
A general slicing inequality for measures of convex bodies |
| title_full |
A general slicing inequality for measures of convex bodies |
| title_fullStr |
A general slicing inequality for measures of convex bodies |
| title_full_unstemmed |
A general slicing inequality for measures of convex bodies |
| title_sort |
general slicing inequality for measures of convex bodies |
| publisher |
SpringerOpen |
| series |
Journal of Inequalities and Applications |
| issn |
1029-242X |
| publishDate |
2019-05-01 |
| description |
Abstract We consider the following inequality: μ(L)n−kn≤CkmaxH∈Grn−kμ(L∩H), $$\begin{aligned} \mu (L)^{\frac{n-k}{n}} \leq C^{k}\max_{H\in \mathit{Gr}_{n-k}}\mu (L \cap H), \end{aligned}$$ which is a variant of the notable slicing inequality in convex geometry, where L is an origin-symmetric star body in Rn ${{\mathbb{R}}}^{n}$ and is μ-measurable, μ is a nonnegative measure on Rn ${\mathbb{R}} ^{n}$, Grn−k $\mathit{Gr}_{n-k}$ is the Grassmanian of an n−k $n-k$-dimensional subspaces of Rn ${\mathbb{R}}^{n}$, and C is a constant. By constructing the generalized k-intersection body with respect to μ, we get some results on this inequality. |
| topic |
Convex bodies Intersection bodies Generalized measures |
| url |
http://link.springer.com/article/10.1186/s13660-019-2085-8 |
| work_keys_str_mv |
AT yufengyu ageneralslicinginequalityformeasuresofconvexbodies AT yufengyu generalslicinginequalityformeasuresofconvexbodies |
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