Some novel constructions of optimal Gromov-Hausdorff-optimal correspondences between spheres
Abstract
In this article, as a first contribution, we provide alternative proofs of recent results by Harrison and Jeffs which determine the precise value of the Gromov-Hausdorff (GH) distance between the circle S1 and the n-dimensional sphere Sn (for any n∈N) when endowed with their respective geodesic metrics. Additionally, we prove that the GH distance between S3 and S4 is equal to 12(-14), thus settling the case n=3 of a conjecture by Lim, M\'emoli and Smith.
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