Liouville type theorems for subelliptic systems on the Heisenberg group with general nonlinearity

Authors

  • Vishvesh Kumar Ghent University, Department of Mathematics: Analysis, Logic and Discrete Mathematics
  • Michael Ruzhansky Ghent University, Department of Mathematics: Analysis, Logic and Discrete Mathematics
  • Rong Zhang Chinese Academy of Sciences, HLM, Academy of Mathematics and Systems Science, and Ghent University, Department of Mathematics: Analysis, Logic and Discrete Mathematics

Keywords:

Liouville-type theorem, Lane–Emden system, method of moving plane, Heisenberg group, semilinear subelliptic systems, integral inequalities

Abstract

In this paper, we establish Liouville type results for semilinear subelliptic systems associated with the sub-Laplacian on the Heisenberg group \(\mathbb{H}^{n}\) involving two different kinds of general nonlinearities. The main technique of the proof is the method of moving planes combined with some integral inequalities replacing the role of maximum principles. As a special case, we obtain the Liouville theorem for the Lane–Emden system on the Heisenberg group \(\mathbb{H}^{n}\), which also appears to be a new result in the literature.
Section
Articles

Published

2024-10-15

How to Cite

Kumar, V., Ruzhansky, M., & Zhang, R. (2024). Liouville type theorems for subelliptic systems on the Heisenberg group with general nonlinearity. Annales Fennici Mathematici, 49(2), 561–582. https://doi.org/10.54330/afm.148660