Explicit estimates on positive supersolutions of nonlinear elliptic equations and applications

Abstract

In this paper we consider positive supersolutions of the nonlinear elliptic equation \[- u = (x) f(u)|∇ u|p, in ,\] where 0 p<1, is an arbitrary domain (bounded or unbounded) in N (N 2), f: [0,af) → R+ (0 < af ≤slant +∞) is a non-decreasing continuous function and : → is a positive function. Using the maximum principle we give explicit estimates on positive supersolutions u at each point x∈ where ∇ u0 in a neighborhood of x. As consequences, we discuss the dead core set of supersolutions on bounded domains, and also obtain Liouville type results in unbounded domains with the property that x∈dist (x,∂)=∞.