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arxiv: 2502.15124 · v1 · pith:CCIGDUUC · submitted 2025-02-21 · math.NA · cs.LG· cs.NA· math.DG

Curvature Corrected Nonnegative Manifold Data Factorization

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classification math.NA cs.LGcs.NAmath.DG
keywords dataanalysisfactorizationnonnegativemanifoldmanifold-valuedcc-nmdfcorrected
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Data with underlying nonlinear structure are collected across numerous application domains, necessitating new data processing and analysis methods adapted to nonlinear domain structure. Riemannanian manifolds present a rich environment in which to develop such tools, as manifold-valued data arise in a variety of scientific settings, and Riemannian geometry provides a solid theoretical grounding for geometric data analysis. Low-rank approximations, such as nonnegative matrix factorization (NMF), are the foundation of many Euclidean data analysis methods, so adaptations of these factorizations for manifold-valued data are important building blocks for further development of manifold data analysis. In this work, we propose curvature corrected nonnegative manifold data factorization (CC-NMDF) as a geometry-aware method for extracting interpretable factors from manifold-valued data, analogous to nonnegative matrix factorization. We develop an efficient iterative algorithm for computing CC-NMDF and demonstrate our method on real-world diffusion tensor magnetic resonance imaging data.

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Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Riemannian Archetypal Analysis: Interpretable non-linear data analysis on deformed star distributions

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    Riemannian archetypal analysis projects data onto a manifold of geodesically convex archetype combinations via pullback geometry on deformed star distributions.