Multiple solutions to a weakly coupled purely critical elliptic system in bounded domains

Abstract

We study the weakly coupled critical elliptic system equation* cases - u=μ1|u|2*-2u+λα |u|α-2|v|βu & in ,\\ - v=μ2|v|2*-2v+λβ |u|α|v|β-2v & in ,\\ u=v=0 & on ∂, cases equation* where is a bounded smooth domain in RN, N≥ 3, 2*:=2NN-2 is the critical Sobolev exponent, μ1,μ2>0, α, β>1, α+β =2* and λ∈R. We establish the existence of a prescribed number of fully nontrivial solutions to this system under suitable symmetry assumptions on , which allow domains with finite symmetries, and we show that the positive least energy symmetric solution exhibits phase separation as λ -∞. We also obtain existence of infinitely many solutions to this system in =RN.