In this work, a very efficient mixed-potential integral-equation formulation is implemented for the rigorous analysis of multilayered structures with arbitrarily-shaped two-dimensional periodic metallic and/or dielectric inclusions. Original acceleration techniques have been developed for the computation of the components of the scalar and dyadic Green's functions, based on different types of asymptotic extractions according to the potential considered. The theoretical approach and its computational convenience have been validated through different full-wave analyses concerning both scattering problems and complex-mode dispersive behaviours in various frequency-selective structures for microwave applications. © 2011 EUROPEAN MICROWAVE ASSOC.
An enhanced integral-equation formulation for accurate analysis of frequency-selective structures / G., Valerio; Galli, Alessandro; D. R., Wilton; D. R., Jackson. - (2011), pp. 179-182. (Intervento presentato al convegno 14th European Microwave Week 2011: "Wave to the Future, EuMW 2011 - 41st EuropeanMicrowave Conference, EuMC 2011 tenutosi a Manchester nel 10 October 2011 through 13 October 2011).
An enhanced integral-equation formulation for accurate analysis of frequency-selective structures
GALLI, Alessandro;
2011
Abstract
In this work, a very efficient mixed-potential integral-equation formulation is implemented for the rigorous analysis of multilayered structures with arbitrarily-shaped two-dimensional periodic metallic and/or dielectric inclusions. Original acceleration techniques have been developed for the computation of the components of the scalar and dyadic Green's functions, based on different types of asymptotic extractions according to the potential considered. The theoretical approach and its computational convenience have been validated through different full-wave analyses concerning both scattering problems and complex-mode dispersive behaviours in various frequency-selective structures for microwave applications. © 2011 EUROPEAN MICROWAVE ASSOC.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.