Curvature exponent of sub-Finsler Heisenberg groups
Abstract
The curvature exponent Ncurv of a metric measure space is the smallest number N for which the measure contraction property MCP(0,N) holds. In this paper, we study the curvature exponent of sub-Finsler Heisenberg groups equipped with the Lebesgue measure. We prove that Ncurv ≥ 5, and the equality holds if and only if the corresponding sub-Finsler Heisenberg group is actually sub-Riemannian. Furthermore, we show that for every N≥ 5, there is a sub-Finsler structure on the Heisenberg group such that Ncurv=N.
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