Lp-Minkowski Problem under Curvature Pinching

Abstract

Let K be a smooth, origin-symmetric, strictly convex body in Rn. If for some ∈ GL(n,R), the anisotropic Riemannian metric 12D2 · K2, encapsulating the curvature of K, is comparable to the standard Euclidean metric of Rn up-to a factor of γ > 1, we show that K satisfies the even Lp-Minkowski inequality and uniqueness in the even Lp-Minkowski problem for all p ≥ pγ := 1 - n+1γ. This result is sharp as γ 1 (characterizing centered ellipsoids in the limit) and improves upon the classical Minkowski inequality for all γ < ∞. In particular, whenever γ ≤ n+1, the even log-Minkowski inequality and uniqueness in the even log-Minkowski problem hold.