Simultaneous Wiener-Hopf Equations and Their Application to Diffraction Problems in Electromagnetic Theory
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概要
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Simultaneous Wiener-Hopf equations with the kernel which is a symmetric and normal Jacobi matrix and their application to diffraction problems in electromagnetic theory are discussed. It can be sbown that there exists a constant orthogonal matrix such that it transforms the kernel into a diagonal form, so the standard Wiener-Hopf procedure can be applied to solve the n simultaneous equations exactly. On the basis of this result, a treatment is made of the problem of a duct with n semi-infinite parallel plates. Under appropriate conditions a rigorous solution is obtained by an elementary method without recourse to Sylvester's theorem.
- 社団法人日本物理学会の論文
- 1964-07-05
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関連論文
- Simultaneous Wiener-Hopf Equations and Their Application to Diffraction Problems in Electromagnetic Theory. III
- Simultaneous Wiener-Hopf Equations and Their Application to Diffraction Problems in Electromagnetic Theory. IV
- Simultaneous Wiener-Hopf Equations and Their Application to Diffraction Problems in Electromagnetic Theory
- Simultaneous Wiener-Hopf Equations and Their Application to Diffraction Problems in Electromagnetic Theory. II