Linear Lipschitz and C¹ extension operators through random projection
classification
🧮 math.FA
math.MG
keywords
extensionlipschitzprojectionrandombanachclosedconstructdirectly
read the original abstract
We construct a regular random projection of a metric space onto a closed doubling subset and use it to linearly extend Lipschitz and $C^1$ functions. This way we prove more directly a result by Lee and Naor and we generalize the $C^1$ extension theorem by Whitney to Banach spaces.
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