具有反平方无限势阱的抛物方程的近似边界可控性

IF 1.3 2区 数学 Q1 MATHEMATICS Nonlinear Analysis-Theory Methods & Applications Pub Date : 2024-08-01 DOI:10.1016/j.na.2024.113624
Arick Shao , Bruno Vergara
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引用次数: 0

摘要

我们考虑有界域 Ω⊆Rn 上的热算子,其临界奇异势发散为到 ∂Ω 的距离的反平方。尽管最近 Enciso 等人 (2023) 在所有维度上证明了此类算子的空边界可控性,但其关键假设是:(i) Ω 是凸的;(ii) 控制必须沿∂Ω 的所有方向规定;(iii) 奇异势的强度必须限制在特定子范围内。在本文中,我们证明了这些算子的近似边界控制结果,我们(i) 不假设 Ω 的凸性,(ii) 允许控制在任意 x0∈∂Ω 附近局部化,(iii) 处理奇异势的全部强度参数。此外,我们降低了对∂Ω 和低阶系数的正则性要求。关键的新颖之处在于 x0 附近的局部卡勒曼估计,其权重经过精心选择,既考虑到了适当的边界条件,又考虑到了∂Ω 的局部几何形状。
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Approximate boundary controllability for parabolic equations with inverse square infinite potential wells

We consider heat operators on a bounded domain ΩRn, with a critically singular potential diverging as the inverse square of the distance to Ω. Although null boundary controllability for such operators was recently proved in all dimensions in Enciso et al. (2023) , it crucially assumed (i) Ω was convex, (ii) the control must be prescribed along all of Ω, and (iii) the strength of the singular potential must be restricted to a particular subrange. In this article, we prove instead a definitive approximate boundary control result for these operators, in that we (i) do not assume convexity of Ω, (ii) allow for the control to be localized near any x0Ω, and (iii) treat the full range of strength parameters for the singular potential. Moreover, we lower the regularity required for Ω and the lower-order coefficients. The key novelty is a local Carleman estimate near x0, with a carefully chosen weight that takes into account both the appropriate boundary conditions and the local geometry of Ω.

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来源期刊
CiteScore
3.30
自引率
0.00%
发文量
265
审稿时长
60 days
期刊介绍: Nonlinear Analysis focuses on papers that address significant problems in Nonlinear Analysis that have a sustainable and important impact on the development of new directions in the theory as well as potential applications. Review articles on important topics in Nonlinear Analysis are welcome as well. In particular, only papers within the areas of specialization of the Editorial Board Members will be considered. Authors are encouraged to check the areas of expertise of the Editorial Board in order to decide whether or not their papers are appropriate for this journal. The journal aims to apply very high standards in accepting papers for publication.
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