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AbstractWe 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… Click to show full abstract
AbstractWe 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.
Journal Title: Journal of Inequalities and Applications
Year Published: 2019
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