Level Set Method for Motion by Mean Curvature

• dc.contributor.author: Colding, Tobias
• dc.contributor.author: Minicozzi, William
• dc.date.issued: 2016-11
• dc.identifier.issn: 0002-9920
• dc.identifier.issn: 1088-9477
• dc.identifier.uri: http://hdl.handle.net/1721.1/115945
• dc.description.abstract: Modeling of a wide class of physical phenomena, such as crystal growth and flame propagation, leads to tracking fronts moving with curvature-dependent speed. When the speed is the curvature this leads to one of the classical degenerate nonlinear second-order differential equations on Euclidean space. One naturally wonders, “What is the regularity of solutions?” A priori solutions are only defined in a weak sense, but it turns out that they are always twice differentiable classical solutions. This result is optimal; their second derivative is continuous only in very rigid situations that have a simple geometric interpretation. The proof weaves together analysis and geometry. Without deeply understanding the underlying geometry, it is impossible to prove fine analytical properties.
• dc.publisher: American Mathematical Society (AMS)
• dc.relation.isversionof: http://dx.doi.org/10.1090/NOTI1439
• dc.source: American Mathematical Society
• dc.type: Article
• dc.identifier.citation: Colding, Tobias Holck and William P. Minicozzi. “Level Set Method for Motion by Mean Curvature.” Notices of the American Mathematical Society 63, 10 (November 2016): 1148–1153 © 2016 American Mathematical Society
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.contributor.mitauthor: Colding, Tobias
• dc.contributor.mitauthor: Minicozzi, William
• dc.relation.journal: Notices of the American Mathematical Society
• dc.eprint.version: Final published version
• dc.identifier.orcid: https://orcid.org/0000-0001-6208-384X
• dc.identifier.orcid: https://orcid.org/0000-0003-4211-6354