The many-body Blaschke-Santaló type inequality via optimal transport

Abstract

Let K1,…,Kk⊂ Rn be origin-symmetric measurable sets of finite volume such that \[ Σ1 i<j k xi,xj k2, ∀\,xi∈ Ki, xj∈ Kj. \] We prove the sharp many-body Blaschke--Santaló type inequality \[ Πi=1k |Ki| |Bn|k \] proposed by Kalantzopoulos and Saroglou, and characterize all equality cases. The proof combines multi-marginal optimal transport with a pseudo-Euclidean volume estimate. Using the geometric--functional equivalence of Kalantzopoulos and Saroglou, we also establish the functional version inequality proposed by Kolesnikov and Werner.