Liouville-type Theorems for Stable Solutions of the H\'enon-Lane-Emden System
Abstract
We investigate the H\'enon-Lane-Emden system defined by - u=|x|a |v|p-1v and - v=|x|b |u|q-1u in RN \!\! \0\. We begin by establishing a general Liouville-type theorem for the subcritical case. Then we prove that the H\'enon-Lane-Emden conjecture is valid for solutions stable outside a compact set, provided that 0 < \,\p, q\ < 1, or 0 ≤ a - b ≤ (N-2)(p - q), or N ≤ 2(p+q+2)pq-1 + 10. Additional Liouville-type theorems for the subcritical case are also obtained. Furthermore, we address the supercritical case. To our knowledge, these results constitute the first Liouville-type theorems for this class of solutions in the H\'enon-Lane-Emden system. As a by-product, several existing results in the literature are refined.
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