Method of Integral Equations for Solving 3D Electromagnetic Diffraction Problems in a Perturbed Layer Using Parallel Computations
We consider a Dirichlet boundary value problem for the Helmholtz equation in a three-dimensional layer with a local perturbation S of the boundary and apply the solution technique based on equivalent reduction to a boundary integral equation (IE). We prove the unique solvability of the IE and its Fredholm property, the convergence of the Galerkin method applied for its numerical solution, and describe parallel algorithms and computational techniques developed speciˉcally when S is a set of many disjoint irregularities.
Y.V.Shestopalov Y.G.Smirnov
Karlstad University,Karlstad,Sweden Penza State University,Penza,Russia
国际会议
Progress in Electromagnetics Research Symposium 2008(2008年电磁学研究新进展学术研讨会)(PIERS 2008)
杭州
英文
1-5
2008-03-24(万方平台首次上网日期,不代表论文的发表时间)