On the triple junction problem on the plane without symmetry hypotheses

Abstract

We investigate the Allen-Cahn system equation* u-Wu(u)=0, u:R2→R2, equation* where W∈ C2(R2,[0,+∞)) is a potential with three global minima. We establish the existence of an entire solution u which possesses a triple junction structure. The main strategy is to study the global minimizer u of the variational problem equation* ∫B1 ( 2|∇ u|2+1W(u) )\,dz,\ \ u=g on ∂ B1. equation* The point of departure is an energy lower bound that plays a crucial role in estimating the location and size of the diffuse interface. We do not impose any symmetry hypothesis on the solution.