Segregated solutions for a critical elliptic system with a small interspecies repulsive force
Abstract
We consider the elliptic system - ui = ui3+Σj=1 j=iq+1 βijui uj2\ in\ R4, \ i=1,…,q+1. when α:=βij and β:=βi(q+1)=β(q+1)j for any i,j=1,…,q. If β<0 and |β| is small enough we build solutions such that each component u1,…,uq blows-up at the vertices of q polygons placed in different great circles which are linked to each other, and the last component uq+1 looks like the radial positive solution of the single equation.
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