Characterization of the Eigenvalues and Eigenfunctions of the Helmholtz Newtonian operator N^k

Zhe Wang, Ahcene Ghandriche, Jijun Liu
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Abstract

The Newtonian potential operator for the Helmholtz equation, which is represented by the volume integral with fundamental solution as kernel function, is of great importance for direct and inverse scattering of acoustic waves. In this paper, the eigensystem for the Newtonian potential operator is firstly shown to be equivalent to that for the Helmholtz equation with nonlocal boundary condition for a bounded and simply connected Lipschitz-regular domain. Then, we compute explicitly the eigenvalues and eigenfunctions of the Newtonian potential operator when it is defined in a 3-dimensional ball. Furthermore, the eigenvalues' asymptotic behavior is demonstrated. To illustrate the behavior of certain eigenfunctions, some numerical simulations are included.
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亥姆霍兹牛顿算子 N^k 的特征值和特征函数的表征
亥姆霍兹方程的牛顿势算子由基本解为核函数的体积积分表示,对于声波的直接和反向散射具有重要意义。本文首先证明了牛顿势算子的特征系等价于有界且简单连接的 Lipschitz 不规则域中具有非局部边界条件的 Helmholtz 方程的特征系,然后明确计算了牛顿势算子在三维球中定义时的特征值和特征函数。此外,我们还证明了特征值的渐近行为。为了说明某些特征函数的行为,还包括一些数值模拟。
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