A semilinear elliptic equation with competing powers and a radial potential

Abstract

We verify the existence of radial positive solutions for the semi-linear equation -\, u=up\,-\,V(y)\,uq,\, u>0, in RN where N≥ 3, p is close to p*:=(N+2)/(N-2), and V is a radial smooth potential. If q is super-critical, namely q>p*, we prove that this Problem has a radial solution behaving like a super-position of bubbles blowing-up at the origin with different rates of concentration, provided V(0)<0. On the other hand, if N/(N-2)<q<p*, we prove that this Problem has a radial solution behaving like a super-position of flat bubbles with different rates of concentration, provided r ∞ V(r) <0.