Liouville type theorems for elliptic equations with Dirichlet conditions in exterior domains

Abstract

In this paper, we are mainly concerned with the Dirichlet problems in exterior domains for the following elliptic equations: equationGPDE0 (-)α2u(x)=f(x,u) \,\,\,\,\,\,\,\,\,\,\,\, in \,\,\,\, r:=\x∈Rn\,|\,|x|>r\ equation with arbitrary r>0, where n≥2, 0<α≤ 2 and f(x,u) satisfies some assumptions. A typical case is the Hardy-H\'enon type equations in exterior domains. We first derive the equivalence between GPDE0 and the corresponding integral equations equationGIE0 u(x)=∫_rGα(x,y)f(y,u(y))dy, equation where Gα(x,y) denotes the Green's function for (-)α2 in r with Dirichlet boundary conditions. Then, we establish Liouville theorems for GIE0 via the method of scaling spheres developed in DQ0 by Dai and Qin, and hence obtain the Liouville theorems for GPDE0. Liouville theorems for integral equations related to higher order Navier problems in r are also derived.