Symmetry of solutions of minimal gradient graph equations on punctured space
Abstract
In this paper, we study symmetry and existence of solutions of minimal gradient graph equations on punctured space Rn\0\, which include the Monge-Amp\`ere equation, inverse harmonic Hessian equation and the special Lagrangian equation. This extends the classification results of Monge-Amp\`ere equations. Under some conditions, we also give the characterization of the solvability on exterior Dirichlet problem in terms of their asymptotic behaviors.
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