Classification of solutions to an nth order conformally invariant elliptic equation on Rn with nonlocal nonlinearity
Abstract
This paper concerns a conformally invariant elliptic problem on Rn driven by (-Δ)n/2 that has a nonlocal exponential nonlinearity of Choquard type. The problem under consideration is a nonlocal generalization of the constant Q-curvature problem on Rn. We classify the asymptotic behavior at infinity of all solutions that satisfy a suitable integrability assumption. Under a growth restriction at infinity and a lower bound on the energy we provide an explicit classification for solutions. The classification is heuristically consistent with the classification of the corresponding local problem.
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