On Coron's problem for weakly coupled elliptic systems

Abstract

We consider the following critical weakly coupled elliptic system \[ cases - ui = μi |ui|2*-2ui + Σj ≠ i βij |uj|2*2 |ui|2*-42 ui & in ui >0 & in ui = 0 & on ∂ ,cases i =1,…,m, \] in a domain ⊂ RN, N=3,4, with small shrinking holes as the parameter 0. We prove the existence of positive solutions of two different types: either each density concentrates around a different hole, or we have groups of components such that all the components within a single group concentrate around the same point, and different groups concentrate around different points.