Liouville type theorems for stable solutions of elliptic system involving the Grushin operator

Abstract

We examine the degenerate elliptic system -s u = vp, -s v= uθ, u,v>0 in \; RN=RN1× RN2, where \;\;\;\; s ≥ 0\;\; and \;\;p,θ >0. We prove that the system has no smooth stable solution provided p,θ >0 and Ns< 2 + α + β, where α = 2(p+1)pθ - 1 and β = 2(θ +1)pθ - 1. This result is an extension of some result in MY. In particular, we establish a new the integral estimate for u and v \;(see Proposition 1.1), which is crucial to deal with the case 0 < p < 1.