Hausdorff Stability of the Cut Locus Under C2-Perturbations of the Metric

Abstract

In this article, we prove the stability with respect to the Hausdorff metric dH of the cut locus Cut(p, g) of a point p in a compact Riemannian manifold (M, g) under C2 perturbation of the metric. Specifically, given a sequence of metrics gi on M, converging to g in the C2 topology, and a sequence of points pi in M, converging to p, we show that i dH( Cut(pi, gi), Cut(p, g) ) = 0. Along the way, we also prove the continuous dependence of the cut time map on the metric.

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