On Fractional Kirchhoff Problems with Liouville–Weyl Fractional Derivatives

IF 0.3 4区数学 Q4 MATHEMATICS Journal of Contemporary Mathematical Analysis-Armenian Academy of Sciences Pub Date : 2024-04-25 DOI:10.3103/s1068362324700055

N. Nyamoradi, C. E. Torres Ledesma

引用次数: 0

Abstract

In this paper, we study the following fractional Kirchhoff-type problem with Liouville–Weyl fractional derivatives:

$$\begin{cases}\left[a+b\left(\int\limits_{\mathbb{R}}(|u|^{2}+|{{}_{-\infty}}D_{x}^{\beta}u|^{2})dx\right)^{\varrho-1}\right]({{}_{x}}D_{\infty}^{\beta}({{}_{-\infty}}D_{x}^{\beta}u)+u)=|u|^{2^{*}_{\beta}-2}u,in~\mathbb{R},\\ u\in\mathbb{I}_{-}^{\beta}(\mathbb{R}),\end{cases}$$

where $\beta\in(0,\frac{1}{2})$, $\varrho>1$, ${{}_{-\infty}}D_{x}^{\beta}u(\cdot)$, and ${{}_{x}}D_{\infty}^{\beta}u(\cdot)$ denote the left and right Liouville–Weyl fractional derivatives, $2_{\beta}^{*}=\frac{2}{1-2\beta}$ is fractional critical Sobolev exponent $a\geq 0$ and $b>0$. Under suitable values of the parameters $\varrho$, $a$ and $b$, we obtain a nonexistence result of nontrivial solutions of infinitely many nontrivial solutions for the above problem.

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论带柳维尔-韦尔分式导数的分式基尔霍夫问题

摘要在本文中，我们研究了以下带有Liouville-Weyl分数导数的分数基尔霍夫型问题：$$\begin{cases}\left[a+b\left(\int\limits_{\mathbb{R}}(|u|^{2}+|{{}_{-\infty}}D_{x}^{\beta}u|^{2})dx\right)^{\varrho-1}\right]({{}_{x}}D_{\infty}^{\beta}({{}_{-\infty}}D_{x}^{\beta}u)+u)=|u|^{2^{*}_{\beta}-2}u,in~\mathbb{R},\\ u\in\mathbb{I}_{-}^{\beta}(\mathbb{R}),\end{cases}$$where $\beta\in(0,\frac{1}{2})$, $\varrho>1）, （{{}_{-\infty}}D_{x}^{\beta}u(\cdot)）, 和（{{}_{x}}D_{\infty}^{\beta}u(\cdot)）分别表示左右两个Liouville-Weyl分数导数、\(2_{\beta}^{*}=\frac{2}{1-2\beta}$是分数临界索博列夫指数（a\geq 0\) and$b>；0$.在参数$varrho$、$a$和$b$的合适值下，我们得到了上述问题无穷多非微观解的不存在结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Contemporary Mathematical Analysis-Armenian Academy of Sciences MATHEMATICS-

CiteScore

0.70

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Journal of Contemporary Mathematical Analysis (Armenian Academy of Sciences) is an outlet for research stemming from the widely acclaimed Armenian school of theory of functions, this journal today continues the traditions of that school in the area of general analysis. A very prolific group of mathematicians in Yerevan contribute to this leading mathematics journal in the following fields: real and complex analysis; approximations; boundary value problems; integral and stochastic geometry; differential equations; probability; integral equations; algebra.