We consider the evolution of an entire convex graph in euclidean space with speed given by a symmetric function of the principal curvatures. Under suitable assumptions on the speed and on the initial data, we prove that the solution exists for all times and it remains a graph. In addition, after appropriate rescaling, it converges to a homothetically expanding solution of the flow. In this way, we extend to a class of nonlinear speeds the well known results of Ecker and Huisken for the mean curvature flow.
Alessandroni, R., Sinestrari, C. (2015). Evolution of convex entire graphs by curvature flows. GEOMETRIC FLOWS, 1(1), 111-125 [10.1515/geofl-2015-0006].
Evolution of convex entire graphs by curvature flows
SINESTRARI, CARLO
2015-01-01
Abstract
We consider the evolution of an entire convex graph in euclidean space with speed given by a symmetric function of the principal curvatures. Under suitable assumptions on the speed and on the initial data, we prove that the solution exists for all times and it remains a graph. In addition, after appropriate rescaling, it converges to a homothetically expanding solution of the flow. In this way, we extend to a class of nonlinear speeds the well known results of Ecker and Huisken for the mean curvature flow.| File | Dimensione | Formato | |
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