一类拟线性SchrO¨dinger方程正解的存在性

doi:10.12677/PM.2023.133072

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一类拟线性SchrO^¨dinger方程正解的存在性
Existence of Positive Solutions for Quasilinear Schr^¨dinger Equations

DOI: 10.12677/PM.2023.133072, PDF, HTML, 下载: 200 浏览: 306
作者: 周敏：上海理工大学理学院，上海
关键词: 拟线性SchrO^¨dinger方程；变分方法；L^∞-估计；Morse迭代；Quasilinear SchrO^¨dinger Equations； Variational Methods； ^∞-Estimate； Mores Iteration

摘要: 本文讨论如下一类拟线性SchrO^¨dinger方程

其中V(x):ℝ^N→ℝ为位势函数，γ > 0,且N≥3.当γ∈(0,γ₀)时，我们得到了上述问题的正解.此外当位势函数V(x)≡V_∞ > 0,我们在H²(ℝ^N)∩ C²(ℝ^N)上证明了经典径向正解u_γ的存在性,且γ→0⁺时，满足u_γ→u₀，其中u₀是以下半线性问题的基态解:

Abstract: This paper focuses on a class of quasilinear SchrO^¨dinger equations:

where V(x):ℝ^N→ℝ is a given potential,γ > 0 and N≥3. Firstly, we obtain a positive solution for the above problem in γ∈(0,γ₀). The potential function V(x) is considered in V(x)≡V_∞ > 0. We prove the existence of a positive classical radial solution u_γ and up to a subsequence,u_γ→u₀ in H²(ℝ^N)∩ C²(ℝ^N) as γ→0⁺, where u₀ is the ground state of the following semilinear problem:

文章引用：周敏. 一类拟线性SchrO^¨dinger方程正解的存在性[J]. 理论数学, 2023, 13(3): 669-682. https://doi.org/10.12677/PM.2023.133072

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