Existence of Positive Solutions to a Fractional-Kirchhoff System

Pub Date : 2024-01-03 DOI:10.1007/s10255-024-1111-x

Peng-fei Li, Jun-hui Xie, Dan Mu

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Abstract

Let Ω be a bounded smooth domain in ℝ^N (N ≥ 3). Assuming that 0 < s < 1, $1 < p,q \le {{N + 2s} \over {N - 2s}}$ with $(p,q) \ne ({{N + 2s} \over {N - 2s}},{{N + 2s} \over {N - 2s}})$, and a, b > 0 are constants, we consider the existence results for positive solutions of a class of fractional elliptic system below,

$$\left\{{\matrix{{(a + b[u]_s^2){{(- \Delta)}^s}u = {v^p} + {h_1}(x,u,v,\nabla u,\nabla v),} \hfill & {x \in \Omega,} \hfill \cr {{{(- \Delta)}^s}v = {u^q} + {h_2}(x,u,v,\nabla u,\nabla v),} \hfill & {x \in \Omega,} \hfill \cr {u,v > 0,} \hfill & {x \in \Omega,} \hfill \cr {u = v = 0,} \hfill & {x \in {\mathbb{R}^N}\backslash \Omega.} \hfill \cr}}\right.$$

Under some assumptions of h_i(x, u, v, ∇u, ∇v)(i = 1, 2), we get a priori bounds of the positive solutions to the problem (1.1) by the blow-up methods and rescaling argument. Based on these estimates and degree theory, we establish the existence of positive solutions to problem (1.1).

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分数基尔霍夫系统正解的存在性

设 Ω 是 ℝN 中的有界光滑域（N ≥ 3）。假设 0 < s < 1, $1 < p,q \le {{N + 2s}\over {N - 2s}}$ with $(p,q) \ne ({{N + 2s}\over {N - 2s}},{{N + 2s}\over {N - 2s}})$, and a, b >；0 是常数，我们考虑下面一类分数椭圆系统正解的存在性结果，$$\left\{{(a + b[u]_s^2){{(- \Delta)}^s}u = {v^p}+ {h_1}(x,u,v,\nabla u,\nabla v),} \hfill & {x \in \Omega,} \hfill \cr {{(- \Delta)}^s}v = {u^q}+ {h_2}(x,u,v,\nabla u,\nabla v),} \hfill & {x \in \Omega,} \hfill\cr {u,v > 0,} \hfill & {x \in \Omega,} \hfill\cr {u = v = 0,} \hfill & {x \in {mathbb{R}^N}\backslash \Omega.}。\在对 hi(x,u,v,∇u,∇v)(i=1,2)的一些假设下，我们通过炸毁法和重定标论证得到了问题（1.1）正解的先验边界。基于这些估计和度理论，我们建立了问题 (1.1) 的正解的存在性。

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