In this paper we show stability and convergence for a novel Galerkin boundary element method approach to the impedance boundary value problem for the Helmholtz equation in a half-plane with piecewise constant boundary data. This problem models, for example, outdoor sound propagation over inhomogeneous flat terrain. To achieve a good approximation with a relatively low number of degrees of freedom we employ a graded mesh with smaller elements adjacent to discontinuities in impedance, and a special set of basis functions for the Galerkin method so that, on each element, the approximation space consists of polynomials (of degree $u$) multiplied by traces of plane waves on the boundary. In the case where the impedance is constant outside an interval $[a,b]$, which only requires the discretization of $[a,b]$, we show theoretically and experimentally that the $L_2$ error in computing the acoustic field on $[a,b]$ is ${cal O}(log^{u+3/2}|k(b-a)| M^{-(u+1)})$, where $M$ is the number of degrees of freedom and $k$ is the wavenumber. This indicates that the proposed method is especially commendable for large intervals or a high wavenumber. In a final section we sketch how the same methodology extends to more general scattering problems.
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机译:在本文中,我们展示了一种新颖的Galerkin边界元方法在具有分段常数边界数据的半平面中解决Helmholtz方程的阻抗边界值问题的稳定性和收敛性。例如,此问题模拟了室外声音在不均匀平坦地形上的传播。为了以相对较低的自由度实现良好的近似,我们采用了渐变网格,其中较小的元素与阻抗的不连续点相邻,并且使用了Galerkin方法的特殊基础函数集,以便在每个元素上都包含近似空间多项式(度数 nu $)乘以边界上平面波的轨迹。如果阻抗在区间$ [a,b] $之外是恒定的,只需要离散化$ [a,b] $,我们将在理论和实验上证明在计算声场上的$ L_2 $误差$ [a,b] $是$ { cal O}( log ^ { nu + 3/2} | k(ba)| M ^ {-( nu + 1)})$,其中$ M $是自由度的数量,$ k $是波数。这表明该方法对于大间隔或高波数特别值得推荐。在最后一节中,我们概述了相同的方法如何扩展到更一般的散射问题。
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