This paper deals with the study of differential inequalities with gradient terms on Carnot groups. We are mainly focused on inequalities of the form Δφu≥f(u)l(|∇0u|), where f, l and φ are continuous functions satisfying suitable monotonicity assumptions and Δφ is the φ-Laplace operator, a natural generalization of the p-Laplace operator which has recently been studied in the context of Carnot groups. We extend to general Carnot groups the results proved in Magliaro et al. (2011) [7] for the Heisenberg group, showing the validity of Liouville-type theorems under a suitable Keller–Osserman condition. In doing so, we also prove a maximum principle for inequality Δφu≥f(u)l(|∇0u|). Finally, we show sharpness of our results for a general φ-Laplacian.
A note on Keller–Osserman conditions on Carnot groups
MAGLIARO, Marco
2012-01-01
Abstract
This paper deals with the study of differential inequalities with gradient terms on Carnot groups. We are mainly focused on inequalities of the form Δφu≥f(u)l(|∇0u|), where f, l and φ are continuous functions satisfying suitable monotonicity assumptions and Δφ is the φ-Laplace operator, a natural generalization of the p-Laplace operator which has recently been studied in the context of Carnot groups. We extend to general Carnot groups the results proved in Magliaro et al. (2011) [7] for the Heisenberg group, showing the validity of Liouville-type theorems under a suitable Keller–Osserman condition. In doing so, we also prove a maximum principle for inequality Δφu≥f(u)l(|∇0u|). Finally, we show sharpness of our results for a general φ-Laplacian.
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