A note on the nonexistence of positive supersolutions to elliptic equations with gradient terms

Abstract

We prove that if the elliptic problem - u+b(x)|∇ u|=c(x)u with c0 has a positive supersolution in a domain of N 3, then c,b must satisfy the inequality \[ ∫ cφ2 ∫ | ∇φ|2+ ∫ b24φ2,~~~φ ∈ Cc∞().\] As an application, we obtain Liouville type theorems for positive supersolutions in exterior domains when c(x)-b2(x)4>0 for large |x|, but unlike the known results we allow the case |x|→∞c(x)-b2(x)4=0. Also the weights b and c are allowed to be unbounded. In particular, among other things, we show that if τ:=|x| →∞|xb(x)|<∞ then this problem does not admit any positive supersolution if \[|x| →∞|x|2c(x)> (N-2+τ)24,\] and, when τ=∞, we have the same if \[R→∞ R( ∈fR<|x|<2 R (c(x)-b(x)24)R2<|x|<4 R|b(x)|)=∞.\]