Large time behavior of exponential surface diffusion flows on R
Abstract
We consider a surface diffusion flow of the form V=∂s2f(-) with a strictly increasing smooth function f typically, f(r)=er, for a curve with arc-length parameter s, where denotes the curvature and V denotes the normal velocity. The conventional surface diffusion flow corresponds to the case when f(r)=r. We consider this equation for the graph of a function defined on the whole real line R. We prove that there exists a unique global-in-time classical solution provided that the first and the second derivatives are bounded and small. We further prove that the solution behaves like a solution to a self-similar solution to the equation V=-f'(0). Our result justifies the explanation for grooving modeled by Mullins (1957) directly obtained by Gibbs--Thomson law without linearization of f near =0.
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