Liouville theorems for elliptic equations involving regional fractional Laplacian with order in (0,\,1/2]

Abstract

In this paper, some elliptic equation in a bounded open domain in RN (N≥ 2) with C2 boundary ∂ is considered. The problem is driven by the regional fractional Laplacian, the infinitesimal generator of the censored symmetric 2α-stable process in . Probability theory asserts that the censored 2α-stable process can not approach the boundary when α∈(0,12]. For α∈ (0,12], our purpose in this article is to show that non-existence of solutions bounded from above or bounded from below for the particular Poisson problem (-)α u= 1 in\ \, \, and non-existence of nonnegative nontrivial solutions of the Lane-Emden equation (-)α u=up in\ \, , u=0 on\ ∂.