On the Planar Triple Junction Problem Without Symmetry Hypotheses
发布时间:2022年11月07日
浏览次数:3206
发布者: Wenqiong Li
主讲人: 耿志远(西班牙巴斯克应用数学中心)
活动时间: 从 2022-11-23 15:00 到 16:00
场地: 线上
For the scalar two-phase (elliptic) Allen-Cahn equation, there is a rich literature on a celebrated conjecture of De-Giorgi, which establishes the relationship of the diffuse interface with minimal surfaces. On the other hand, for three or more equally preferred phases, a vector order parameter is required. The structure of the diffuse interface is analogous to a singular minimal cone. These solutions are studied mostly in the presence of symmetry, but not at all in the general case.
In this talk, I will present some joint work with Nicholas Alikakos on the Allen-Cahn equation with a triple-well potential. We construct a minimizing solution that possesses a weak triple junction structure. The location and size of the diffuse interface are estimated from a tight energy upper/lower bound. We do not impose any symmetry hypothesis on the solution and we do not employ Gamma-convergence techniques.
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