Fast k-means clustering in Riemannian manifolds via Fr\'echet maps: Applications to large-dimensional SPD matrices
Abstract
We introduce a novel, efficient framework for clustering data on high-dimensional, non-Euclidean manifolds that overcomes the computational challenges associated with standard intrinsic methods. The key innovation is the use of the p-Fr\'echet map Fp : M R -- defined on a generic metric space M -- which embeds the manifold data into a lower-dimensional Euclidean space R using a set of reference points \ri\i=1, ri ∈ M. Once embedded, we can efficiently and accurately apply standard Euclidean clustering techniques such as k-means. We rigorously analyze the mathematical properties of Fp in the Euclidean space and the challenging manifold of n × n symmetric positive definite matrices SPD(n). Extensive numerical experiments using synthetic and real SPD(n) data demonstrate significant performance gains: our method reduces runtime by up to two orders of magnitude compared to intrinsic manifold-based approaches, all while maintaining high clustering accuracy, including scenarios where existing alternative methods struggle or fail.
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