Diffraction of a Plane Acoustic Wave from a Finite Soft (Rigid) Cone in Axial Irradiation

D. Kuryliak, Z. Nazarchuk, Victor Lysechko
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引用次数: 13

Abstract

The problem of diffraction of a plane acoustic wave by a finite soft (rigid) cone is investigated. This one is formulated as a mixed boundary value problem for the three-dimensional Helmholtz equation with Dirichlet (Neumann) boundary condition on the cone surface. The diffracted field is sought as expansion of unknown velocity potential in series of eigenfunctions for each region of the existence of sound pressure. The solution of the problem then is reduced to the infinite set of linear algebraic equations (ISLAE) of the first kind by means of mode matching technique and orthogonality properties of the Legendre functions. The main part of asymptotic of ISLAE matrix element determined for large indexes identifies the convolution type operator amenable to explicit inversion. This analytical treatment allows one to transform the initial diffraction problem into the ISLAE of the second kind that can be readily solved by the reduction method with desired accuracy depending on a number of truncation. All these determine the analytical regularization method for solution of wave diffraction problems for conical scatterers. The boundary transition to soft (rigid) disc is considered. The directivity factors, scattering cross sections, and far-field diffraction patterns are investigated in both soft and rigid cases whereas the main attention in the near-field is focused on the rigid case. The numerically obtained results are compared with those known for the disc.
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有限软(刚性)锥平面声波在轴向辐照下的衍射
研究了有限软(刚性)锥对平面声波的衍射问题。该问题被表述为锥面上具有Dirichlet (Neumann)边界条件的三维亥姆霍兹方程的混合边值问题。对于声压存在的每一个区域,衍射场都是未知速度势在一系列特征函数中的展开式。然后利用模式匹配技术和勒让德函数的正交性将问题的解简化为第一类线性代数方程组的无穷集。ISLAE矩阵元素的渐近部分主要用于确定大指标的可显式反演的卷积型算子。这种解析处理允许将初始衍射问题转化为第二类的ISLAE,这种ISLAE可以很容易地用约简法求解,并根据截断的次数获得所需的精度。这些都决定了圆锥散射体波衍射问题的解析正则化解法。考虑了边界向软(刚性)盘的过渡。研究了软硬两种情况下的指向性因子、散射截面和远场衍射图,而近场主要关注刚性情况。数值计算得到的结果与已知的盘的结果进行了比较。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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