Omnibus CLTs for Fréchet means and nonparametric inference on non-Euclidean spaces

Bhattacharya, Rabi; Lin, Lizhen

doi:10.1090/proc/13216

Omnibus CLTs for Fréchet means and nonparametric inference on non-Euclidean spaces
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by Rabi Bhattacharya and Lizhen Lin PDF

Proc. Amer. Math. Soc. 145 (2017), 413-428 Request permission

Abstract:

Two central limit theorems for sample Fréchet means are derived, both significant for nonparametric inference on non-Euclidean spaces. The first theorem encompasses and improves upon most earlier CLTs on Fréchet means and broadens the scope of the methodology beyond manifolds to diverse new non-Euclidean data, including those on certain stratified spaces which are important in the study of phylogenetic trees. It does not require that the underlying distribution $Q$ have a density and applies to both intrinsic and extrinsic analysis. The second theorem focuses on intrinsic means on Riemannian manifolds of dimensions $d>2$ and breaks new ground by providing a broad CLT without any of the earlier restrictive support assumptions. It makes the statistically reasonable assumption of a somewhat smooth density of $Q$. The excluded case of dimension $d=2$ proves to be an enigma, although the first theorem does provide a CLT in this case as well under a support restriction. The second theorem immediately applies to spheres $S^d$, $d>2$, which are also of considerable importance in applications to axial spaces and to landmarks-based image analysis, as these spaces are quotients of spheres under a Lie group $\mathcal G$ of isometries of $S^d$.

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