Oliver Curvature Bounds for the Brownian Continuum Random Tree

Abstract

We compute bounds in the expected Ollivier curvature for the Brownian continuum random tree Te. The results indicate that when the scale dependence of the Ollivier curvature is properly taken into account, the Ollivier-Ricci curvature of Te is bounded above by every element of R for almost all points of Te. This parallels the well-known result that every continuum tree is a CAT(K) space for all K∈R.

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