Geodesic
Stereographic compactification and affine bi-Lipschitz homeomorphisms
Glasgow mathematical journal, Tome 66 (2024) no. 3, pp. 582-596

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DOI

Let $\sigma _q \,:\,{{\mathbb{R}}^q} \to{\textbf{S}}^q\setminus N_q$ be the inverse of the stereographic projection with center the north pole $N_q$. Let $W_i$ be a closed subset of ${\mathbb{R}}^{q_i}$, for $i=1,2$. Let $\Phi \,:\,W_1 \to W_2$ be a bi-Lipschitz homeomorphism. The main result states that the homeomorphism $\sigma _{q_2}\circ \Phi \circ \sigma _{q_1}^{-1}$ is a bi-Lipschitz homeomorphism, extending bi-Lipschitz-ly at $N_{q_1}$ with value $N_{q_2}$ whenever $W_1$ is unbounded.As two straightforward applications in the polynomially bounded o-minimal context over the real numbers, we obtain for free a version at infinity of: (1) Sampaio’s tangent cone result and (2) links preserving re-parametrization of definable bi-Lipschitz homeomorphisms of Valette.
DOI : 10.1017/S001708952400017X
Mots-clés : bi-Lipschitz homeomorphism, Euclidean inversion, Stereographic compactification 
Grandjean, Vincent; Oliveira, Roger. Stereographic compactification and affine bi-Lipschitz homeomorphisms. Glasgow mathematical journal, Tome 66 (2024) no. 3, pp. 582-596. doi: 10.1017/S001708952400017X
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     title = {Stereographic compactification and affine {bi-Lipschitz} homeomorphisms},
     journal = {Glasgow mathematical journal},
     pages = {582--596},
     year = {2024},
     volume = {66},
     number = {3},
     doi = {10.1017/S001708952400017X},
     url = {http://geodesic.mathdoc.fr/articles/10.1017/S001708952400017X/}
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