THE GREEN–OSHER INEQUALITY IN RELATIVE GEOMETRY
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Publication:3186391
DOI10.1017/S0004972715001859zbMath1358.52014MaRDI QIDQ3186391
Publication date: 9 August 2016
Published in: Bulletin of the Australian Mathematical Society (Search for Journal in Brave)
relative geometryminimal annulusBonnesen-style inequalitiesSteiner polynomialsGreen-Osher inequalities
Inequalities and extremum problems involving convexity in convex geometry (52A40) Length, area, volume and convex sets (aspects of convex geometry) (52A38) Convex sets in (2) dimensions (including convex curves) (52A10)
Related Items (2)
The log-Minkowski inequality of curvature entropy ⋮ Nonsymmetric extension of the Green-Osher inequality
Cites Work
- The log-Brunn-Minkowski inequality
- An isoperimetric inequality with applications to curve shortening
- Curve shortening makes convex curves circular
- On a non-local curve evolution problem in the plane
- On the minimal convex annulus of a planar convex body
- On Blaschke's extension of Bonnesen's inequality
- Evolving plane curves by curvature in relative geometries
- Evolving plane curves by curvature in relative geometries. II
- Steiner polynomials, Wulff flows, and some new isoperimetric inequalities for convex plane curves
- Pseudo-Minkowski differential geometry
- Bounds on the roots of the Steiner polynomial
- Bonnesen-Style Isoperimetric Inequalities
- STEINER POLYNOMIALS VIA ULTRA-LOGCONCAVE SEQUENCES
- On the roots of the Steiner polynomial of a 3-dimensional convex body
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