A note on the concurrent normal conjecture

Abstract

It is conjectured since long that for any convex body K ∈ Rn there exists a point in the interior of K which belongs to at least 2n normals from different points on the boundary of K. The conjecture is known to be true for n=2,3,4. Motivated by a recent preprint of Y. Martinez-Maure, we give a short proof of his result: for dimension n≥ 3, under mild conditions, almost every normal through a boundary point to a smooth convex body K∈ Rn contains an intersection point of at least 6 normals from different points on the boundary of K.