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Measure Upper Bounds of Nodal Sets of Robin Eigenfunctions

arXiv:1801.02114

Abstract

In this paper, we obtain the upper bounds for the Hausdorff measures of nodal sets of eigenfunctions with the Robin boundary conditions, i.e., \begin{equation*} {\left\{\begin{array}{l} \triangle u+λu=0,\quad in\quad Ω,\\ u_ν+μu=0,\quad on\quad\partialΩ, \end{array} \right.} \end{equation*} where the domain $Ω\subseteq\mathbb{R}^n$, $u_ν$ means the derivative of $u$ along the outer normal direction of $\partialΩ$. We show that, if $Ω$ is bounded and analytic, and the corresponding eigenvalue $λ$ is large enough,then the measure upper bounds for the nodal sets of eigenfunctions are $C\sqrtλ$, where $C$ is a positive constant depending only on $n$ and $Ω$ but not on $μ$ We also show that, if $\partialΩ$ is $C^{\infty}$ smooth and $\partialΩ\setminusΓ$ is piecewise analytic, where $Γ\subseteq\partialΩ$ is a union of some $n-2$ dimensional submanifolds of $\partialΩ$, $μ>0$, and $λ$ is large enough, then the corresponding measure upper bounds for the nodal sets of $u$ are $C(\sqrtλ+μ^α+μ^{-cα})$ for some positive number $α$, where $c$ is a positive constant depending only on $n$, and $C$ is a positive constant depending on $n$, $Ω$, $Γ$ and $α$.

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