A new type of bubble solutions for a Schr\"odinger equation with critical growth
Abstract
In this paper, we investigate the following critical elliptic equation - u+V(y)u=uN+2N-2,\,\,u>0,\,\,in\,N,\,\,u∈ H1(N), where V(y) is a bounded non-negative function in N. Assuming that V(y)=V(|y|,y*),y=(y,y*)∈ 4× N-4 and gluing together bubbles with different concentration rates, we obtain new solutions provided that N≥ 7, whose concentrating points are close to the point (r0,y*0) which is a stable critical point of the function r2V(r,y*) satisfying r0>0 and V(r0,y*0)>0. In order to construct such new bubble solutions for the above problem, we first prove a non-degenerate result for the positive multi-bubbling solutions constructed in PWY-18-JFA by some local Pohozaev identities, which is of great interest independently. Moreover, we give an example which satisfies the assumptions we impose.
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