A compact embedding result for nonlocal Sobolev spaces and multiplicity of sign-changing solutions for nonlocal Schrödinger equations

IF 1.2 4区 数学 Q1 MATHEMATICS Acta Mathematica Scientia Pub Date : 2024-08-27 DOI:10.1007/s10473-024-0512-5
Xu Zhang, Hao Zhai, Fukun Zhao
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引用次数: 0

Abstract

For any s ∈ (0, 1), let the nonlocal Sobolev space Xs(ℝN) be the linear space of Lebesgue measure functions from ℝN to ℝ such that any function u in Xs(ℝN) belongs to L2(ℝN) and the function

$$(x,y)\longmapsto\big(u(x)-u(y)\big)\sqrt{K(x-y)}$$

is in L2(ℝN, ℝN). First, we show, for a coercive function V(x), the subspace

$$E:=\bigg\{u\in X^s(\mathbb{R}^N):\int_{\mathbb{R}^N}V(x)u^2{\rm d}x<+\infty\bigg\}$$

of Xs(ℝN) is embedded compactly into Lp(ℝN) for \(p\in[2,2_s^*)\), where \(2_s^*\) is the fractional Sobolev critical exponent. In terms of applications, the existence of a least energy sign-changing solution and infinitely many sign-changing solutions of the nonlocal Schrödinger equation

$$-{\cal{L}_K}u+V(x)u=f(x,u),\ x\in\ \mathbb{R}^N$$

are obtained, where \(-{\cal{L}_K}\) is an integro-differential operator and V is coercive at infinity.

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非局部索波列夫空间的紧凑嵌入结果和非局部薛定谔方程符号变化解的多重性
对于任意 s∈ (0,1),让非局部 Sobolev 空间 Xs(ℝN) 是从 ℝN 到 ℝ 的 Lebesgue 度量函数的线性空间,使得 Xs(ℝN) 中的任何函数 u 都属于 L2(ℝN),并且函数$$(x、y)\longmapsto\big(u(x)-u(y)\big)\sqrt{K(x-y)}$$ 在 L2(ℝN, ℝN) 中。首先,我们证明,对于胁迫函数 V(x),子空间$E:=\bigg\{u\in X^s(\mathbb{R}^N):\int_{/mathbb{R}^N}V(x)u^2{rm d}x<+\infty\bigg\}$$的Xs(ℝN)子空间紧凑地嵌入到Lp(ℝN)中,为\(p\in[2,2_s^*)\),其中\(2_s^*\)是分数索博列夫临界指数。在应用方面,得到了非局部薛定谔方程$$-{\cal{L}_K}u+V(x)u=f(x,u),\x\\in\mathbb{R}^N$$的最小能量符号变化解和无穷多个符号变化解的存在,其中\(-{\cal{L}_K}\)是一个整微分算子,V在无穷处是强制的。
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来源期刊
CiteScore
2.00
自引率
10.00%
发文量
2614
审稿时长
6 months
期刊介绍: Acta Mathematica Scientia was founded by Prof. Li Guoping (Lee Kwok Ping) in April 1981. The aim of Acta Mathematica Scientia is to present to the specialized readers important new achievements in the areas of mathematical sciences. The journal considers for publication of original research papers in all areas related to the frontier branches of mathematics with other science and technology.
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