Measure contraction property, curvature exponent and geodesic dimension of sub-Finsler p-Heisenberg groups

Abstract

We initiate the study of synthetic curvature-dimension bounds in sub-Finsler geometry. More specifically, we investigate the measure contraction property MCP(K, N), and the geodesic dimension on the Heisenberg group equipped with an p-sub-Finsler norm. We show that for p∈(2,∞], the p-Heisenberg group fails to satisfy any of the measure contraction properties. On the other hand, if p∈(1,2), then it satisfies the measure contraction property MCP(K, N) if and only if K ≤ 0 and N ≥ Np, where the curvature exponent Np is strictly greater than 2q+1 (q being the H\"older conjugate of p). We also prove that the geodesic dimension of the p-Heisenberg group is (2q+2,5) for p∈[1,∞). As a consequence, we provide the first example of a metric measure space where there is a gap between the curvature exponent and the geodesic dimension.