An Equivalent ABCD-Matrix Formalism for Non-Local Wire Media with Arbitrary Terminations
Alexander B. Yakovlev, M\'ario G. Silveirinha, George W. Hanson,, Chandra S. R. Kaipa

TL;DR
This paper introduces an analytical ABCD-matrix formalism for non-local wire media with arbitrary terminations, enabling efficient modeling of complex bounded structures by capturing non-local effects and interface behaviors.
Contribution
It develops a simple circuit-model formalism using ABCD matrices for non-local wire media, accounting for non-reciprocal and lossy interface behaviors while maintaining overall energy conservation.
Findings
Efficient modeling of bounded wire media with arbitrary terminations.
Validation through numerical examples including multilayer configurations.
Demonstrates rapid solution for complex geometries.
Abstract
A simple analytical model based on the transmission-matrix approach is proposed for equivalent wire-medium (WM) interfaces. The obtained ABCD matrices for equivalent interfaces capture the non-local effects due to the evanescent transverse magnetic (TM) WM mode and in part due to the propagating transverse electromagnetic (TEM) WM mode. This enables one to characterize the overall response of bounded WM structures by cascading the ABCD matrices of equivalent WM interfaces and WM slabs as transmission lines supporting only the propagating TEM WM mode, resulting in a simple circuit-model formalism for bounded WM structures with arbitrary terminations, including the open-end, patch/slot arrays, and thin metal/2D material, among others. The individual ABCD matrices for equivalent WM interfaces apparently violate the conservation of energy and reciprocity, and therefore, the equivalent…
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