Farthest points on most Alexandrov surfaces
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Joël Rouyer
und
Costin Vîlcu
Abstract
We study global maxima of distance functions on most Alexandrov surfaces with curvature bounded below, where most is used in the sense of Baire categories.
Acknowledgements
Both authors express thanks to Tudor Zamfirescu for suggesting to investigate properties of most Alexandrov surfaces.
Communicated by: M. Henk
Funding: The authors were partly supported by the grant PN-II-ID-PCE-2011-3-0533 of the Romanian National Authority for Scientific Research, CNCS-UEFISCDI. The first author was also partly supported by the Centre Francophone en Mathématique de Bucarest.
References
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© 2020 Walter de Gruyter GmbH, Berlin/Boston
Artikel in diesem Heft
- Frontmatter
- The cone topology on masures
- A calculus for conformal hypersurfaces and new higher Willmore energy functionals
- On plane curves given by separated polynomials and their automorphisms
- Rational quartic symmetroids
- Voisin’s conjecture for zero-cycles on Calabi–Yau varieties and their mirrors
- Nef vector bundles on a quadric surface with the first Chern class (2, 1)
- A proof of a conjecture by Haviv, Lyubashevsky and Regev on the second moment of a lattice Voronoi cell
- Toric log del Pezzo surfaces with one singularity
- Farthest points on most Alexandrov surfaces
Artikel in diesem Heft
- Frontmatter
- The cone topology on masures
- A calculus for conformal hypersurfaces and new higher Willmore energy functionals
- On plane curves given by separated polynomials and their automorphisms
- Rational quartic symmetroids
- Voisin’s conjecture for zero-cycles on Calabi–Yau varieties and their mirrors
- Nef vector bundles on a quadric surface with the first Chern class (2, 1)
- A proof of a conjecture by Haviv, Lyubashevsky and Regev on the second moment of a lattice Voronoi cell
- Toric log del Pezzo surfaces with one singularity
- Farthest points on most Alexandrov surfaces
