Spikes of the two-component elliptic system in 4 with Sobolev critical exponent

Abstract

Consider the following elliptic system: equation* \&-2 u1+λ1u1=μ1u13+α1u1p-1+β u22u1&in,\\ &-2 u2+λ2u2=μ2u23+α2u2p-1+β u12u2&in,\\ &u1,u2>0, u1=u2=0∂,. equation* where ⊂4 is a bounded domain, λi,μi,αi>0(i=1,2) and β=0 are constants, >0 is a small parameter and 2<p<2*=4. By using the variational method, we study the existence of the ground state solution to this system for >0 small enough. The concentration behavior of the ground state solution as 0+ is also studied. Furthermore, by combining the elliptic estimates and local energy estimates, we also obtain the location of the spikes as 0+. To the best of our knowledge, this is the first attempt devoted to the spikes in the Bose-Einstein condensate in 4.