and Li, X., Preservation of bounded geometry under sphericalization and ﬂattening: quasiconvexity and ∞ -Poincar´ e inequality,Ann

Durand-Cartagena, E · 2017

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Preserving Besov (fractional Sobolev) energies under sphericalization and flattening

math.FA · 2024-09-26 · unverdicted · novelty 6.0

New sphericalization and flattening mappings on metric spaces preserve doubling measures and Besov energies, with compositions biLipschitz equivalent to the original.

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Preserving Besov (fractional Sobolev) energies under sphericalization and flattening math.FA · 2024-09-26 · unverdicted · none · ref 11
New sphericalization and flattening mappings on metric spaces preserve doubling measures and Besov energies, with compositions biLipschitz equivalent to the original.

and Li, X., Preservation of bounded geometry under sphericalization and ﬂattening: quasiconvexity and ∞ -Poincar´ e inequality,Ann

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