Euclidean embedding, randomized clustering, and Lipschitz extension for finite and doubling subsets of Lp when p>2
Abstract
Fix p>2. We prove that the Euclidean distortion of every n-point subset of Lp is p3( n)12+o(1), thus, in particular, demonstrating that all n-point subsets of Lp exhibit an asymptotic improvement over the O( n) Euclidean distortion guarantee that Bourgain's embedding theorem provides for arbitrary n-point metric spaces. We also prove that the separation modulus of every n-point subset of Lp is O(p2 n), which is sharp up to the dependence on p. We deduce from (a refinement of) this asymptotic evaluation of the finitary separation modulus of Lp that for any n-point subset C of Lp, any Banach space Z, and any 1-Lipschitz function f:C Z, there exists a O(p2 n)-Lipschitz function F:Lp Z that extends f. We obtain analogous separation and extension statements for doubling subsets of Lp.
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