Shortest Path through Random Points
Abstract
Let (M,g1) be a complete d-dimensional Riemannian manifold for d > 1. Let Xn be a set of n sample points in M drawn randomly from a smooth Lebesgue density f supported in M. Let x,y be two points in M. We prove that the normalized length of the power-weighted shortest path between x, y through Xn converges almost surely to a constant multiple of the Riemannian distance between x,y under the metric tensor gp = f2(1-p)/d g1, where p > 1 is the power parameter.
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