Allen-Cahn Solutions with Triple Junction Structure at Infinity

Abstract

We construct an entire solution U:R22 to the elliptic system \[ U=∇uW(U), \] where W:R2 [0,∞) is a `triple-well' potential. This solution is a local minimizer of the associated energy \[ ∫ 12|∇ U|2+W(U)\,dx \] in the sense that U minimizes the energy on any compact set among competitors agreeing with U outside that set. Furthermore, we show that along subsequences, the `blowdowns' of U given by UR(x):=U(Rx) approach a minimal triple junction as R∞. Previous results had assumed various levels of symmetry for the potential and had not established local minimality, but here we make no such symmetry assumptions.