The planar Busemann-Petty centroid inequality and its stability

TL;DR

This paper studies the asymptotic behavior of a specific geometric flow for convex bodies, proving stability and convergence results related to the planar Busemann-Petty centroid inequality.

Contribution

It introduces a stability version of the planar Busemann-Petty centroid inequality using the $ty$-flow and improves convergence results to the smooth topology.

Findings

Normalized solutions converge to the unit disk in Hausdorff metric

Established a stability version of the Busemann-Petty centroid inequality

Proved convergence in the $ ext{C}^$ topology

Abstract

In [Centro-affine invariants for smooth convex bodies, Int. Math. Res. Notices. doi: 10.1093/imrn/rnr110, 2011] Stancu introduced a family of centro-affine normal flows, $p$-flow, for $1\leq p<\infty.$ Here we investigate the asymptotic behavior of the planar $p$-flow for $p=\infty$ in the class of smooth, origin-symmetric convex bodies. First, we prove that the $\infty$-flow evolves suitably normalized origin-symmetric solutions to the unit disk in the Hausdorff metric, modulo $SL(2).$ Second, using the $\infty$-flow and a Harnack estimate for this flow, we prove a stability version of the planar Busemann-Petty centroid inequality in the Banach-Mazur distance. Third, we prove that the convergence of normalized solutions in the Hausdorff metric can be improved to convergence in the $\mathcal{C}^{\infty}$ topology.