Clustering of Boundary Interfaces for an inhomogeneous Allen-Cahn equation on a smooth bounded domain

Abstract

We consider the inhomogeneous Allen-Cahn equation ε2 u\,+\,V(y)(1-u2)\,u\,=\,0 in\ , ∂ u∂ \,=\,0 on\ ∂ , where is a bounded domain in R2 with smooth boundary ∂ and V(x) is a positive smooth function, ε>0 is a small parameter, denotes the unit outward normal of ∂. For any fixed integer N≥ 2, we will show the existence of a clustered solution uε with N-transition layers near ∂ with mutual distance O(ε| ε|), provided that the generalized mean curvature H of ∂ is positive and ε stays away from a discrete set of values at which resonance occurs. Our result is an extension of those (with dimension two) by A. Malchiodi, W.-M. Ni, J. Wei in Pacific J. Math. (Vol. 229, 2007, no. 2, 447-468) and A. Malchiodi, J. Wei in J. Fixed Point Theory Appl. (Vol. 1, 2007, no. 2, 305-336)