We study the approximation of driven motion by crystalline curvature in two dimensions with a reaction-diffusion type differential inclusion. A quasi-optimal and an optimal error bound between the original flow and the zero level set of the approximate solution are proved, for the regular and the double obstacle potential respectively. This result is valid before the onset of singularities, and applies when the driving force does not depend on the space variable. A comparison principle between crystalline flows and a notion of weak solution for crystalline evolutions are also obtained.
Approximation to driven motion by crystalline curvature in two dimensions
NOVAGA, MATTEO
2000-01-01
Abstract
We study the approximation of driven motion by crystalline curvature in two dimensions with a reaction-diffusion type differential inclusion. A quasi-optimal and an optimal error bound between the original flow and the zero level set of the approximate solution are proved, for the regular and the double obstacle potential respectively. This result is valid before the onset of singularities, and applies when the driving force does not depend on the space variable. A comparison principle between crystalline flows and a notion of weak solution for crystalline evolutions are also obtained.File in questo prodotto:
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