Liouville Type Theorems of Semilinear Equations with Square Sum of Vector Fields

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Abstract

Let X_j ; j = 1, …, k, be first order smooth quasi-homogeneous vector fields on Rn with the property that the dimension of the Lie algebra generated by these vector fields is n at x = 0 and X^∗_j = -X_j, j = 1, …, k. Let L = \sum^k_{i=1} X²_i . In this paper, we study the nonnegative solutions of semilinear equation Lu + f(x, u) = 0 (or ≤ 0 ) in Rn and generalized cone domain, respectively, and prove that the solutions must be vanish under some suitable conditions.

Keywords:

Liouville type theorem;superlinear equation;local Hörmander condition;square sum operator;generalized cone domain
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Liouville Type Theorems of Semilinear Equations with Square Sum of Vector Fields. (2005). Journal of Partial Differential Equations, 18(2), 149-153. https://www.global-sci.com/index.php/jpde/article/view/4040