Liouville type theorem for critical order H\'enon-Lane-Emden type equations on a half space and its applications

Abstract

In this paper, we are concerned with the critical order H\'enon-Lane-Emden type equations with Navier boundary condition on a half space Rn+: equationNPDE0\\cases (-)n2 u(x)=f(x,u(x)),\ u(x)≥0,\ x∈Rn+, \\ u=(-)u = ·s = (-)n2-1u = 0,\ x∈∂Rn+, casesequation where u∈ Cn(Rn+) Cn-2(Rn+) and n≥2 is even. We first consider the typical case f(x,u)=|x|aup with 0≤ a<∞ and 1<p<∞. We prove the super poly-harmonic properties and establish the equivalence between (0.1) and the corresponding integral equations equationIE0 u(x)=∫Rn+G(x,y)f(y,u(y))dy, equation where G(x,y) denotes the Green's function for (-)n2 on Rn+ with Navier boundary conditions. Then, we establish Liouville theorem for (0.2) via ``the method of scaling spheres" developed initially in DQ0 by Dai and Qin, and hence we obtain the Liouville theorem for (0.1) on Rn+. As an application of the Liouville theorem on Rn+ (Theorem 1.6) and Liouville theorems in Rn established in Chen, Dai and Qin [4] for n≥4 and Bidaut-V\'eron and Giacomini [1] for n=2, we derive a priori estimates and existence of positive solutions to critical order Lane-Emden equations in bounded domains for all n≥2 and 1<p<∞. Extensions to IEs and PDEs with general nonlinearities f(x,u) are also included.