Evolving convex curves to constant \(k\)-order width ones by a perimeter-preserving flow
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Publication:1673763
DOI10.1007/s00229-017-0977-9zbMath1395.35101OpenAlexW2759245419MaRDI QIDQ1673763
Publication date: 14 September 2018
Published in: Manuscripta Mathematica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00229-017-0977-9
Nonlinear parabolic equations (35K55) Initial value problems for second-order parabolic equations (35K15) Curves in Euclidean and related spaces (53A04)
Cites Work
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- Evolving convex curves to constant-width ones by a perimeter-preserving flow
- Some remarks about closed convex curves
- On a length preserving curve flow
- A non-local area preserving curve flow
- Curve shortening makes convex curves circular
- On a non-local curve evolution problem in the plane
- On a non-local perimeter-preserving curve evolution problem for convex plane curves
- Evolving a convex closed curve to another one via a length-preserving linear flow
- The heat equation shrinking convex plane curves
- The heat equation shrinks embedded plane curves to round points
- ON A CURVE EXPANDING FLOW WITH A NON-LOCAL TERM
- The dual generalized Chernoff inequality for star-shaped curves
- On a planar area-preserving curvature flow
- AN AREA-PRESERVING FLOW FOR CLOSED CONVEX PLANE CURVES
