Asymptotic behavior at infinity of solutions of Lagrangian mean curvature equations

Abstract

We studied the asymptotic behavior of solutions with quadratic growth condition of a class of Lagrangian mean curvature equations Fτ(λ(D2u))=f(x) in exterior domain, where f satisfies a given asymptotic behavior at infinity. When f(x) is a constant near infinity, it is not necessary to demand the quadratic growth condition anymore. These results are a kind of exterior Liouville theorem, and can also be regarded as an extension of theorems of Pogorelov, Flanders and Yuan.