Keller-Osserman type conditions for differential inequalities with gradient terms on the Heisenberg group

Abstract

The aim of this paper is to study the qualitative behaviour of non-negative entire solutions of certain differential inequalities involving gradient terms on the Heisenberg group. We focus our investigation on the two classes of inequalities of the form φ u f(u)l(|∇ u|) and φ u f(u) - h(u) g(|∇ u|), where f,l,h,g are non-negative continuous functions satisfying certain monotonicity properties. The operator φ, called the φ-Laplacian, can be viewed as a natural generalization of the p-Laplace operator recently considered by various authors in this setting. We prove some Liouville theorems introducing two new Keller-Osserman type conditions, both extending the classical one which appeared long ago in the study of the prototype differential inequality u f(u) in m. Furthermore, we show sharpness of our conditions when we specialize to the case of the p-Laplacian. Needless to say, our results continue to hold, with the obvious minor modifications, also in the Euclidean space.