A diffusion process associated with Fr\'echet means

Abstract

This paper studies rescaled images, under -1μ, of the sample Fr\'echet means of i.i.d. random variables \Xk k≥ 1\ with Fr\'echet mean μ on a Riemannian manifold. We show that, with appropriate scaling, these images converge weakly to a diffusion process. Similar to the Euclidean case, this limiting diffusion is a Brownian motion up to a linear transformation. However, in addition to the covariance structure of -1μ(X1), this linear transformation also depends on the global Riemannian structure of the manifold.