Barycentric coordinate neighbourhoods in Riemannian manifolds
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🧮 math.DG
cs.CG
keywords
barycentricmanifoldneighbourhoodriemanniancoordinatecoordinatespointsquantify
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We quantify conditions that ensure that a signed measure on a Riemannian manifold has a well defined centre of mass. We then use this result to quantify the extent of a neighbourhood on which the Riemannian barycentric coordinates of a set of $n+1$ points on an $n$-manifold provide a true coordinate chart, i.e., the barycentric coordinates provide a diffeomorphism between a neighbourhood of a Euclidean simplex, and a neighbourhood containing the points on the manifold.
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Geometric subdivision and multiscale transforms
The chapter reviews geometric constructions for averages, subdivision, and multiresolution transforms on metric spaces, Riemannian manifolds, and groups, with emphasis on convergence and smoothness results.
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