Abstract
Let $0<a<\sqrt 2$. Suppose $\delta=\delta(d,\eps)$ has the following property. If $\mathcal N$ is an $a$-net of the Euclidean ball in $\RR^{d}$, $A\subset \mathcal N$, and $f:A\to \RR^d$ is $(1+\eps)$-bilipschitz, then $f$ admits a $(1+\delta)$-bilipschitz extension $f:\mathcal N\to \RR^d$. We give some estimates of $\delta$.
Citation
Eva Matoušková. "Bilipschitz mappings of nets.." Real Anal. Exchange 29 (1) 2003-2004.
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