We proposed a simple and efficient modular single-source surface integral equation (SS-SIE) formulation for electromagnetic analysis of arbitrarily connected penetrable and perfectly electrical conductor (PEC) objects. In this formulation, a modular equivalent model for each penetrable object consisting of the composite structure is first independently constructed through replacing it by the background medium, no matter whether it is surrounded by the background medium, other media, or partially connected objects, and enforcing an equivalent electric current density on the boundary to remain fields in the exterior region unchanged. Then, by combining all the modular models and any possible PEC objects together, an equivalent model for the composite structure can be derived. The troublesome junction handling techniques are not needed and non-conformal meshes are intrinsically supported. The proposed SS-SIE formulation is simple to implement, efficient, and flexible, which shows significant performance improvement in terms of CPU time compared with the original SS-SIE formulation and the Poggio-Miller-Chang-Harrington-Wu-Tsai (PMCHWT) formulation. Several numerical examples including the coated dielectric cuboid, the large lossy objects, the planar layered dielectric structure, and the partially connected dielectric and PEC structure are carried out to validate its accuracy, efficiency and robustness.
翻译:我们提出了一个简单而高效的模块化单源表面整体组合方程式(SS-SIE)配方,用于对任意连接的穿透和完全电气导体物体进行电磁分析。在这个配方中,由复合结构组成的每个穿透物体的模块等同模型首先通过以背景介质替换而独立构建,无论它是否被背景介质、其他媒体或部分连接的物体所包围,在边界上实施等效的电流密度以保持外部区域的面积不变。然后,通过将所有模块模型和任何可能的PEC物体结合起来,可以得出一个等效的复合结构模型。不需使用麻烦的接合处理技术,非正态的模件也得到内在的支持。拟议的SS-SIE配方程式简单、高效和灵活,与最初的SS-SIE配方、PL-Ciller-Chang-Harrington-Wu-Tsai(PMCHWT)配制相比,其性能显著改善。若干数字示例包括涂层、大亏损天体、大损天体和部分连接的平面结构。