On Ambrosetti-Malchiodi-Ni conjecture on two-dimensional smooth bounded domains: clustering concentration layers

Abstract

We consider the clustering concentration on curves for solutions to the problem 2 div( ∇ a(y) u)- V(y)u+up\, =\, 0, u>0 in , ∇ a(y) u· \, =\, 0on ∂ , where is a bounded domain in R2 with smooth boundary, the exponent p is greater than 1, >0 is a small parameter, V is a uniformly positive smooth potential on , and denotes the outward normal of ∂ . For two positive smooth functions a1(y), a2(y) on , the operator ∇ a(y) is given by ∇ a(y) u=( a1(y)∂ u∂ y1, \, a2(y)∂ u∂ y2).