点式的
边界(拓扑)
数学
数学分析
领域(数学分析)
正多边形
维数(图论)
基质(化学分析)
分歧(语言学)
上下界
电场
边值问题
几何学
物理
纯数学
材料科学
语言学
哲学
量子力学
复合材料
作者
Haigang Li,Longjuan Xu
标识
DOI:10.48550/arxiv.1705.04459
摘要
When a convex perfectly conducting inclusion is closely spaced to the boundary of the matrix domain, a bigger convex domain containing the inclusion, the electric field can be arbitrary large. We establish both the pointwise upper bound and the lower bound of the gradient estimate for this perfect conductivity problem by using the energy method. These results give the optimal blow-up rates of electric field for conductors with arbitrary shape and in all dimensions. A particular case when a circular inclusion is close to the boundary of a circular matrix domain in dimension two is studied earlier by Ammari,Kang,Lee,Lee and Lim(2007). From the view of methodology, the technique we develop in this paper is significantly different from the previous one restricted to the circular case, which allows us further investigate the general elliptic equations with divergence form.
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