The electromagnetic interaction of a vertical magnetic dipole axially symmetric with an infinitesimally thin perfectly conducting circular disk is studied and solved by transforming the original dual integral-equation system describing the problem into two forms of the single second-kind Fredholm integral equation. In this way, simple low- and high-frequency asymptotic solutions are easily derived. Numerical results are provided to validate the proposed solutions.
A Second-Kind Fredholm Integral-Equation Approach for Simple Low- And High-Frequency Solutions of the Perfectly-Conducting Circular Disk / Lovat, G.; Burghignoli, P.; Araneo, R.; Verolino, L.. - (2020), pp. 1-4. (Intervento presentato al convegno 2020 International symposium on electromagnetic compatibility. EMC EUROPE, EMC EUROPE 2020 tenutosi a Virtual, Rome) [10.1109/EMCEUROPE48519.2020.9245877].
A Second-Kind Fredholm Integral-Equation Approach for Simple Low- And High-Frequency Solutions of the Perfectly-Conducting Circular Disk
Lovat G.;Burghignoli P.;Araneo R.;
2020
Abstract
The electromagnetic interaction of a vertical magnetic dipole axially symmetric with an infinitesimally thin perfectly conducting circular disk is studied and solved by transforming the original dual integral-equation system describing the problem into two forms of the single second-kind Fredholm integral equation. In this way, simple low- and high-frequency asymptotic solutions are easily derived. Numerical results are provided to validate the proposed solutions.| File | Dimensione | Formato | |
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