Exponential Crystal Relaxation Model With P-Laplacian

Abstract

In this article we prove the global existence of weak solutions to an initial boundary value problem with an exponential and p-Laplacian nonlinearity. The equation is a continuum limit of a family of kinetic Monte Carlo models of crystal surface relaxation. In our investigation we find a weak solution where the exponent in the equation, -p u, can have a singular part in accordance with the Lebesgue Decomposition Theorem. The singular portion of -p u corresponds to where -p u = -∞, which leads it to have a canceling effect with the exponential nonlinearity. This effect has already been demonstrated for the case of a linear exponent p=2, and for the time independent problem. Our investigation reveals that we can exploit this same effect in the time dependent case with nonlinear exponent. We obtain a solution by first forming a sequence of approximate solutions and then passing to the limit. The key to our existence result lies in the observation that one can still obtain the precompactness of the term e-p u despite a complete lack of estimates in the time direction. However, we must assume that 1<p≤ 2.