The radial part of Brownian motion with respect to L-distance under Ricci flow
Abstract
Let \gt\t∈ [0,T) be a family of complete time-depending Riemannian matrics on a manifold which evolves under backwards Ricci flow. The It\o formula is established for the L-distance of the gt-Brownian motion to a fixed reference point (L-base). Furthermore, as an application, we construct a coupling by parallel displacement which yields a new proof of some results of Topping.
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