The Symmetric Mahler Inequality in Dimension Three via Admissible Shadow Systems

Abstract

The three-dimensional symmetric Mahler inequality states that, for every origin-symmetric convex body \(K=-K⊂ R3\), \[ (K)= |K|\,|K|≥ 323. \] It was recently proved by Iriyeh--Shibata IS2020, and a shorter proof was later given by Fradelizi--Hubard--Meyer--Roldán-Pensado--Zvavitch FHMRZ. Both proofs combine ingenious equipartition arguments of algebraic-topological origin with delicate geometric estimates inspired by Meyer's argument for unconditional bodies. In this paper, we give a new proof of this inequality using a purely geometric approach, based on what we call symmetric admissible shadow systems. This is a natural extension of the new techniques developed in our proof of the three-dimensional non-symmetric Mahler conjecture CLXX-Mahler.