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Resonances, i.e., extrema of the eigenvalues of characteristic modes for closed perfectly conducting objects are investigated. The characteristic modal solutions based on the electric, magnetic, and combined field integral operators (EFIO, MFIO, and CFIO) are studied and compared with analytical solutions for a sphere. All these formulations are found to capture both external (radiating) and internal...
We have proposed an algorithm able to identify open and closed parts of a generic geometry. This information is essential to apply different integral equation formulations to different parts of the structure: the EFIE to open parts and the CFIE to the closed ones. The application of the CFIE is necessary to avoid internal resonances of the structure, but this formulation can not be applied simply...
The Calderon identities have recently gained attention by providing a way to analytically precondition the electric field integral equation (EFIE). In their current state, however, these pre-conditioners are not perfect, having both nonobvious practical difficulties and explicitly stated theoretical limitations. An example of the former is the difficulty in discretizing the preconditioner, while the...
EFIE (electric field integral equation) suffers from internal resonance, and the remedy is to use MFIE (magnetic field integral equation) to come up with a CFIE (combined field integral equation) to remove the internal resonance problem. However, MFIE is fundamentally a very different integral equation from EFIE. Many questions have been raised about the differences.
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