On the exterior Dirichlet problem for Hessian type fully nonlinear elliptic equations
Abstract
We treat the exterior Dirichlet problem for a class of fully nonlinear elliptic equations of the form f(λ(D2u))=g(x), with prescribed asymptotic behavior at infinity. The equations of this type had been studied extensively by Caffarelli--Nirenberg--Spruck Caffarelli1985, Trudinger Trudinger1995 and many others, and there had been significant discussions on the solvability of the classical Dirichlet problem via the continuity method, under the assumption that f is a concave function. In this paper, based on the Perron's method, we establish an exterior existence and uniqueness result for viscosity solutions of the equations by assuming f to satisfy certain structure conditions as in Caffarelli1985,Trudinger1995, which may embrace the well-known Monge--Amp\`ere equations, Hessian equations and Hessian quotient equations as special cases but do not require the concavity.
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