Growth of subsolutions of p u = V|u|p-2u and of a general class of quasilinear equations

Abstract

In this paper we prove some integral estimates on the minimal growth of the positive part u+ of subsolutions of quasilinear equations \[ div A(x,u,∇ u) = V|u|p-2u \] on complete Riemannian manifolds M, in the non-trivial case u+ 0. Here A satisfies the structural assumption |A(x,u,∇ u)|p/(p-1) ≤ k A(x,u,∇ u),∇ u for some constant k>0 and for p>1 the same exponent appearing on the RHS of the equation, and V is a continuous positive function, possibly decaying at a controlled rate at infinity. We underline that the equation may be degenerate and that our arguments do not require any geometric assumption on M beyond completeness of the metric. From these results we also deduce a Liouville-type theorem for sufficiently slowly growing solutions.