On the role of gradient terms in quasilinear coercive differential inequalities on Carnot Groups

Abstract

In the sub-Riemannian setting of Carnot groups, this work investigates a-priori estimates and Liouville type theorems for solutions of coercive, quasilinear differential inequalities of the type G u b(x) f(u) l(|∇ u|). Prototype examples of G are the (subelliptic) p-Laplacian and the mean curvature operator. The main novelty of the present paper is that we allow a dependence on the gradient l(t) that can vanish both as t → 0+ and as t → +∞. Our results improve on the recent literature and, by means of suitable counterexamples, we show that the range of parameters in the main theorems are sharp.