Almost-Riemannian manifolds do not satisfy the CD condition

Abstract

The Lott-Sturm-Villani curvature-dimension condition CD(K,N) provides a synthetic notion for a metric-measure space to have curvature bounded from below by K and dimension bounded from above by N. It was proved by Juillet that a large class of manifolds do not satisfy the CD(K,N) condition, for any K∈ R and N∈(1,∞). However, his result does not cover the case of almost-Riemannian manifolds. In this paper, we address the problem of disproving the CD condition in this setting, providing a new strategy which allows us to contradict the 1-dimensional version of the CD condition. In particular, we prove that 2-dimensional almost-Riemannian manifolds and strongly regular almost-Riemannian manifolds do not satisfy the CD(K,N) condition for any K∈ R and N∈(1,∞).