Classification of positive solutions to the H\'enon-Sobolev critical systems
Abstract
In this paper, we investigate positive solutions to the following H\'enon-Sobolev critical system: -div(|x|-2a∇ u)=|x|-bp|u|p-2u+α|x|-bp|u|α-2|v|βu Rn, -div(|x|-2a∇ v)=|x|-bp|v|p-2v+β|x|-bp|u|α|v|β-2v Rn, u,v∈ Da1,2(Rn), where n≥ 3,-∞< a<n-22,a≤ b<a+1,p=2nn-2+2(b-a),>0 and α>1,β>1 satisfying α+β=p. Our findings are divided into two parts, according to the sign of the parameter a. For a≥ 0, we demonstrate that any positive solution (u,v) is synchronized, indicating that u and v are constant multiples of positive solutions to the decoupled H\'enon equation: equation* -div(|x|-2a∇ w)=|x|-bp|w|p-2w. equation* For a<0 and b>a, we characterize all nonnegative ground states. Additionally, we study the nondegeneracy of nonnegative synchronized solutions. This work also delves into some general k-coupled H\'enon-Sobolev critical systems.
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