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Transition Layer for the Heterogeneous Allen-Cahn Equation

Analysis of PDEs 2015-06-26 v1

Abstract

We consider the equation \e2Δu=(ua(x))(u21)\e^{2}\Delta u=(u-a(x))(u^2-1) in Ω\Omega, uν=0\frac{\partial u}{\partial \nu} =0 on Ω\partial \Omega, where Ω\Omega is a smooth and bounded domain in Rn\R^n, ν\nu the outer unit normal to \paΩ\pa\Omega, and aa a smooth function satisfying 1<a(x)<1-1<a(x)<1 in \ovΩ\ov{\Omega}. We set KK, Ω+\Omega_+ and Ω\Omega_- to be respectively the zero-level set of aa, {a>0} and {a<0}. Assuming a0\nabla a \neq 0 on KK and a0a\ne 0 on Ω\partial \Omega, we show that there exists a sequence \ej0\e_j \to 0 such that the above equation has a solution u\eju_{\e_j} which converges uniformly to ±1\pm 1 on the compact sets of \O±\O_{\pm} as j+j \to + \infty.

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Cite

@article{arxiv.math/0702878,
  title  = {Transition Layer for the Heterogeneous Allen-Cahn Equation},
  author = {Fethi Mahmoudi and Andrea Malchiodi and Juncheng Wei},
  journal= {arXiv preprint arXiv:math/0702878},
  year   = {2015}
}

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25 pages