Liouville theorem for the fractional Lane-Emden Equation in unbounded domain

Abstract

Our purpose of this paper is to study the nonexistence of nonnegative very weak solutions of equationeq 0.1 (-)α u = up+ in ,\ u=g in RN , equation where α∈(0,1), p>0, is a unbounded C2 domain in RN with N>2α, g∈ L1( RN ,dx1+|x|N+2α) nonnegative and is a nonnegative Radon measure. We obtain that (i) if ⊃eq (RN Br0(0)) for some r0>0 and p<NN-2α, then fractional Lane-Emden equation has no weak solutions. (ii) if ⊃eq \x∈ RN:\, x· a>r0\ for some r0 0, a∈ RN and p<N+αN-α, then fractional Lane-Emden equation has no weak solutions. Here N+αN-α is sharp for the nonexistence in the half space. The above Liouville theorem could be applied to obtain nonexistence of classical solution of the fractional Lane-Emden equations (-)α u = up in , u 0 in RN , where =RN Br0(0) with r0>0 or =RN-1×(0,+∞).