Title: | Liouville Theorems for a p-Laplace equation with Hartree type nonlinearity |
Author(s): | Le P. |
Keywords: | Hartree nonlinearity; Liouville theorem; p-Laplace equation; Stable solution |
Abstract: | Let u∈ C1(ℝN) be a weak solution to the equation −Δpu=(1|x|N−α∗|u|q)|u|q−2uinℝN, where 2 ≤ p < N and max{ 0 , N− 2 p} < α< N. We prove that if p < q < qc and u is stable, then u ≡ 0. Here qc is a new critical exponent, which equals to infinity when N+αN−p≥p+12. We also show that if p<q<p(N+α)2(N−p) and u is stable outside a compact set or has a finite Morse index, then u ≡ 0. Our proofs rely on several integral estimates and a Pohozaev type identity. |
Issue Date: | 2021 |
Publisher: | Springer |
URI: | http://digital.lib.ueh.edu.vn/handle/UEH/62002 |
DOI: | https://doi.org/10.1007/s10013-021-00508-5 |
ISSN: | 2305-221X |
Appears in Collections: | INTERNATIONAL PUBLICATIONS
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