Bibliographic Details
| Title: |
Brunn-Minkowski inequality for $\theta$-convolution bodies via Ball's bodies |
| Authors: |
Alonso-Gutiérrez, David, Goñi, Javier Martín |
| Publication Year: |
2022 |
| Collection: |
Mathematics |
| Subject Terms: |
Mathematics - Metric Geometry, 52A40 |
| More Details: |
We consider the problem of finding the best function $\varphi_n:[0,1]\to\mathbb{R}$ such that for any pair of convex bodies $K,L\in\mathbb{R}^n$ the following Brunn-Minkowski type inequality holds $$ |K+_\theta L|^\frac{1}{n}\geq\varphi_n(\theta)(|K|^\frac{1}{n}+|L|^\frac{1}{n}), $$ where $K+_\theta L$ is the $\theta$-convolution body of $K$ and $L$. We prove a sharp inclusion of the family of Ball's bodies of an $\alpha$-concave function in its super-level sets in order to provide the best possible function in the range $\left(\frac{3}{4}\right)^n\leq\theta\leq1$, characterizing the equality cases. |
| Document Type: |
Working Paper |
| Access URL: |
http://arxiv.org/abs/2211.17069 |
| Accession Number: |
edsarx.2211.17069 |
| Database: |
arXiv |
