A short proof of Gr\"unbaum's Conjecture about affine invariant points

Abstract

Let us denote by Kn the hyperspace of all convex bodies of Rn equipped with the Hausdorff distance topology. An affine invariant point p is a continuous and Aff(n)-equivariant map p: Kn Rn, where Aff(n) denotes the group of all nonsingular affine maps of Rn. For every K∈ Kn, let Pn(K)=\p(K)∈ Rn p is an affine invariant point\ and Fn(K)=\x∈ Rn gx=x for every g∈ Aff(n) such that gK=K\. In 1963, B. Gr\"unbaum conjectured that Pn(K)=Fn(K) . After some partial results, the conjecture was recently proven by O. Mordhorst. In this short note we give a rather different, simpler and shorter proof of this conjecture, based merely on the topology of the action of Aff(n) on Kn.