Lagrangian Mean Curvature Equations on exterior domains

Abstract

We introduce an extended exterior (K,K,α0)--quasiconformal mapping method to study the asymptotic behavior at infinity of solutions to the supercritical phase Lagrangian mean curvature equation \[ Σi=1n λi(D2u) = θ + f(x) \] on exterior domains in Rn, where the constant |θ|∈((n-2)π/2,nπ/2), n≥ 2, and f=O(|x|-β) is a perturbation term with the sharp decay condition β>2 at infinity. Our work generalizes the classical exterior Bernstein-type theorem for the special Lagrangian equation (f0) established by Li--Li--Yuan [Adv. Math. (2020)]. Via Perron's method, we solve the corresponding Dirichlet problem outside a bounded, uniformly convex domain, prescribing asymptotic behavior at infinity. For n ≥ 3, we establish existence and uniqueness of viscosity solutions in both the supercritical phase case with f 0 and the subcritical phase case with f 0. This extends earlier work by Li [Trans. Amer. Math. Soc. (2019)] on the exterior Dirichlet problem for the special Lagrangian equation (f 0) under weaker regularity assumptions on the interior boundary and boundary data.