Isotropic Measures and Maximizing Ellipsoids: Between John and Loewner

Abstract

We define a one parameter family of positions of a convex body which interpolates between the John position and the Loewner position: for r>0, we say that K is in maximal intersection position of radius r if Voln(K rB2n)≥ Voln(K rTB2n) for all T∈ SLn. We show that under mild conditions on K, each such position induces a corresponding isotropic measure on the sphere, which is simply a normalized Lebesgue measure on r-1K Sn-1. In particular, for rM satisfying rMnn=Voln(K), the maximal intersection position of radius rM is an M-position, so we get an M-position with an associated isotropic measure. Lastly, we give an interpretation of John's theorem on contact points as a limit case of the measures induced from the maximal intersection positions.