Liouville type theorems for stable solutions of the weighted elliptic system
Abstract
We examine the weighted elliptic system equation* cases - u=(1+|x|2)α2 v,\\ - v=(1+|x|2)α2 up, cases in\;\ RN, equation*where N 5, p>1 and α >0. We prove Liouville type results for the classical positive (nonnegative) stable solutions in dimension N<+α (-2)2 (N <+α (-2)(p+3)4(p+1)) and 5, p ∈ (1,p*()). In particular, for any p>1 and α > 0, we obtain the nonexistence of classical positive (nonnegative) stable solutions for any N 12+5 α (N 12+5α (p+3)2(p+1)).
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