English

Interface dynamics for an Allen-Cahn-type equation governing a matrix-valued field

Analysis of PDEs 2019-06-17 v1

Abstract

We consider the initial value problem for the generalized Allen-Cahn equation, tΦ=ΔΦε2Φ(ΦtΦI),xΩ, t0,\partial_t \Phi = \Delta \Phi-\varepsilon^{-2} \Phi (\Phi^t \Phi - I), \qquad x \in \Omega, \ t\geq 0, where Φ\Phi is an n×nn\times n real matrix-valued field, Ω\Omega is a two-dimensional square with periodic boundary conditions, and ε>0\varepsilon > 0. This equation is the gradient flow for the energy, E(Φ):=12ΦF2+14ε2ΦtΦIF2E(\Phi) := \int \frac{1}{2} \|\nabla \Phi \|^2_F+\frac{1}{4 \varepsilon^2} \| \Phi^t \Phi - I \|^2_F, where F\| \cdot \|_F denotes the Frobenius norm. The primary contribution of this paper is to use asymptotic methods to describe the solution of this initial value problem. If the initial condition has single-signed determinant, at each point of the domain, at a fast O(ε2t)O(\varepsilon^{-2} t) time scale, the solution evolves towards the closest orthogonal matrix. Then, at the O(t)O(t) time scale, the solution evolves according to the OnO_n diffusion equation. Stationary solutions to the OnO_n diffusion equation are analyzed for n=2n=2. If the initial condition has regions where the determinant is positive and negative, a free interface develops. Away from the interface, in each region, the matrix-valued field behaves as in the single-signed determinant case. At the O(t)O(t) time scale, the interface evolves in the normal direction by curvature. At a slow O(εt)O(\varepsilon t) time scale, the interface is driven by curvature and the surface diffusion of the matrix-valued field. For n=2n=2, the interface is driven by curvature and the jump in the squared tangental derivative of the phase across the interface. In particular, we emphasize that the interface when n2n\geq 2 is driven by surface diffusion, while for n=1n=1, the original Allen--Cahn equation, the interface is only driven by mean curvature. A variety of numerical experiments are performed to verify, support, and illustrate our analytical results.

Keywords

Cite

@article{arxiv.1906.05985,
  title  = {Interface dynamics for an Allen-Cahn-type equation governing a matrix-valued field},
  author = {Dong Wang and Braxton Osting and Xiao-Ping Wang},
  journal= {arXiv preprint arXiv:1906.05985},
  year   = {2019}
}

Comments

22 pages, 8 figures

R2 v1 2026-06-23T09:53:24.069Z