Liouville Theorems for the Lane-Emden Equation Involving a Mixed Local-Nonlocal Operator

Abstract

In this paper, we investigate the existence of positive supersolutions for the following mixed local-nonlocal Lane-Emden type equation: -Δu+(-Δ)s u=uq Rn, where n≥ 3, s∈(0,1), and q>1. More precisely, we prove that the equation admits positive distributional supersolutions if and only if q>nn-2s. In the process, we establish several novel properties of mixed local-nonlocal operators, including sharp asymptotic estimates for the fundamental solution, a maximum principle in the distributional sense, and an equivalent integral inequality for supersolutions.