English

Stability and slicing inequalities for intersection bodies

Metric Geometry 2011-08-15 v1

Abstract

We prove a generalization of the hyperplane inequality for intersection bodies, where volume is replaced by an arbitrary measure μ\mu with even continuous density and sections are of arbitrary dimension nk, 1k<n.n-k,\ 1\le k <n. If KK is a generalized kk-intersection body, then μ(K)nnkcn,kmaxHμ(KH)\voln(K)k/n.\mu(K)\,\leq\,\frac{n}{n-k}c_{n,k}\max_{H} \mu(K\cap H) \vol_n(K)^{k/n}. Here cn,k=B2n(nk)/n/B2nk<1,c_{n,k} = |B_2^n|^{(n-k)/n}/|B_2^{n-k}|<1, B2n|B_2^n| is the volume of the unit Euclidean ball, and maximum is taken over all (nk)(n-k)-dimensional subspaces of Rn.\R^n. The constant is optimal, and for each intersection body the inequality holds for every k.k. We also prove a stronger "difference" inequality. The proof is based on stability in the lower dimensional Busemann-Petty problem for arbitrary measures in the following sense. Let \e>0, 1k<n.\e>0,\ 1\le k <n. Suppose that KK and LL are origin-symmetric star bodies in Rn,\R^n, and KK is a generalized kk-intersection body. If for every (nk)(n-k)-dimensional subspace HH of Rn\R^n μ(KH)μ(LH)+\e,\mu(K\cap H)\leq \mu(L\cap H)+\e, then μ(K)μ(L)+nnkcn,k\voln(K)k/n\e.\mu(K)\leq \mu(L) +\frac{n}{n-k}c_{n,k} \vol_n(K)^{k/n}\e.

Keywords

Cite

@article{arxiv.1108.2631,
  title  = {Stability and slicing inequalities for intersection bodies},
  author = {Alexander Koldobsky and Dan Ma},
  journal= {arXiv preprint arXiv:1108.2631},
  year   = {2011}
}
R2 v1 2026-06-21T18:49:47.671Z