从极小集合观察热方程的可观察性

A. Walton Green, Kévin Le Balc'h, Jérémy Martin, Marcu-Antone Orsoni
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引用次数: 0

摘要

我们考虑的是热方程组在具有迪里希特边界条件的$\mathbb R^n$有界$C^1$域上的问题。本文的第一个目的是证明在任意小的 $\delta >0$ 条件下,热方程是可以从任何具有正 $(n-1+\delta)$-Hausdorff 内容的可测集合 $\omega$ 中观测到的。这一证明依赖于对拉普拉斯特征函数线性组合的一种新的谱估计,它是通过雷麦兹式不等式和所谓的勒博-罗比阿诺方法得到的。即使这个可观测性结果在豪斯多夫维度的尺度上是尖锐的,我们的第二个目标也是要构造出$\omega$集合的族,这些集合的codimension大于或等于$1$,对于这些集合,热方程仍然是可观测的。
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Observability of the heat equation from very small sets
We consider the heat equation set on a bounded $C^1$ domain of $\mathbb R^n$ with Dirichlet boundary conditions. The first purpose of this paper is to prove that the heat equation is observable from any measurable set $\omega$ with positive $(n-1+\delta)$-Hausdorff content, for $\delta >0$ arbitrary small. The proof relies on a new spectral estimate for linear combinations of Laplace eigenfunctions, obtained via a Remez type inequality, and the use of the so-called Lebeau-Robbiano's method. Even if this observability result is sharp with respect to the scale of Hausdorff dimension, our second goal is to construct families of sets $\omega$ which have codimension greater than or equal to $1$ for which the heat equation remains observable.
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