Parabolic free boundary phase transition and mean curvature flow
Abstract
It is known that there is a strong relation between the parabolic Allen--Cahn equation and the mean curvature flow, in the sense that the parabolic Allen--Cahn equation can be considered as a "diffused" mean curvature flow. In this work, we derive a forced mean curvature flow \[ v=-H-∂ν |∇ u|+f(u)/|∇ u|, \] satisfied by level surfaces of any solution to the nonlinear parabolic equation \[ ∂tu=Δu-f(u). \] Moreover, we introduce the notion of the inner gradient flow, and unify parabolic free boundary problems in the gradient flow framework. Finally, we consider the parabolic free boundary Allen--Cahn equation \[ \alignedat2 ∂tu&=Δu&&in\|u|<1\ |∇ u|&=1/ε&&on∂\|u|<1\, alignedat . \] and confirm that under reasonable assumptions, the Cα norm of the forcing term ∂ν|∇ u| converges to zero at an algebraic rate as ε 0, uniformly in time. This implies that the parabolic free boundary Allen--Cahn equation converges to the mean curvature flow, uniformly (in ε and in time) in the C2,α sense.
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