We prove a local existence and uniqueness result of crystalline mean curvature flow starting from a compact convex admissible set in IRN. This theorem can handle the facet breaking/bending phenomena, and can be generalized to any anisotropic mean curvature flow. The method provides also a generalized geometric evolution starting from any compact convex set, existing up to the extinction time, satisfying a comparison principle, and defining a continuous semigroup in time. We prove that, when the initial set is convex, our evolution coincides with the flat phi-curvature flow in the sense of Almgren-Taylor-Wang. As a by-product, it turns out that the flat phi-curvature flow starting from a compact convex set is unique.
Bellettini, G., Caselles, V., Chambolle, A., Novaga, M. (2006). Crystalline mean curvature flow of convex sets. ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS, 179(1), 109-152 [10.1007/s00205-005-0387-0].
Crystalline mean curvature flow of convex sets
BELLETTINI, GIOVANNI;
2006-01-01
Abstract
We prove a local existence and uniqueness result of crystalline mean curvature flow starting from a compact convex admissible set in IRN. This theorem can handle the facet breaking/bending phenomena, and can be generalized to any anisotropic mean curvature flow. The method provides also a generalized geometric evolution starting from any compact convex set, existing up to the extinction time, satisfying a comparison principle, and defining a continuous semigroup in time. We prove that, when the initial set is convex, our evolution coincides with the flat phi-curvature flow in the sense of Almgren-Taylor-Wang. As a by-product, it turns out that the flat phi-curvature flow starting from a compact convex set is unique.
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https://hdl.handle.net/11365/1017392