Existence and asymptotic behavior of non-normal conformal metrics on R4 with sign-changing Q-curvature
Abstract
We consider the following prescribed Q-curvature problem equationuno cases 2 u=(1-|x|p)e4u, \,\,R4\\ :=∫R4(1-|x|p)e4udx<∞. cases equation We show that for every polynomial P of degree 2 such that |x|+∞P=-∞, and for every ∈(0,sph), there exists at least one solution which assume the form u=w+P, where w behaves logarithmically at infinity. Conversely, we prove that all solutions have the form v+P, where v(x)=18π2∫R4(|y||x-y|)(1-|y|p)e4udy and P is a polynomial of degree at most 2 bounded from above. Moreover, if u is a solution to the previous problem, it has the following asymptotic behavior u(x)=-8π2|x|+P+o(|x|),\,\,|x|+∞. As a consequence, we give a geometric characterization of solutions in terms of the scalar curvature at infinity of the associated conformal metric e2u|dx|2.
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