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arxiv: 2203.15728 · v2 · pith:UBUYHITUnew · submitted 2022-03-29 · 🧮 math.OC

Wasserstein-Fisher-Rao Splines

classification 🧮 math.OC
keywords curvaturesplinesnotionspacewasserstein-fisher-raoabsolutelyachievealgorithm
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We study interpolating splines on the Wasserstein-Fisher-Rao (WFR) space of measures with differing total masses. To achieve this, we derive the covariant derivative and the curvature of an absolutely continuous curve in the WFR space. We prove that this geometric notion of curvature is equivalent to a Lagrangian notion of curvature in terms of particles on the cone. Finally, we propose a practical algorithm for computing splines extending the work of arXiv:2010.12101.

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  1. On the Differential-Geometric Equivalence of Hellinger-Kantorovich and Cone-Wasserstein Spaces

    math.MG 2026-05 unverdicted novelty 6.0

    Constructive isometry of tangent spaces along lifted geodesics equates local HK Riemannian geometry with Wasserstein geometry on the cone, enabling approximation of HK parallel transport.