Classification of positive solutions to a nonlinear biharmonic equation with critical exponent
Abstract
For n ≥ 5, we consider positive solutions u of the biharmonic equation \[ 2 u = un+4n-4 on\ Rn \0\ \] with a non-removable singularity at the origin. We show that |x|n-42 u is a periodic function of |x| and we classify all periodic functions obtained in this way. This result is relevant for the description of the asymptotic behavior near singularities and for the Q-curvature problem in conformal geometry.
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