Litcius/Paper detail

Edge Modes in Subwavelength Resonators in One Dimension

Habib Ammari, S Barandun, Jinghao Cao, Florian Feppon

2023Multiscale Modeling and Simulation18 citationsDOI

Abstract

.We present the mathematical theory of one-dimensional infinitely periodic chains of subwavelength resonators. We analyze both Hermitian and non-Hermitian systems. Subwavelength resonances and associated modes can be accurately predicted by a finite dimensional eigenvalue problem involving a capacitance matrix. We are able to compute the Hermitian and non-Hermitian Zak phases, showing that the former is quantized and the latter is not. Furthermore, we show the existence of localized edge modes arising from defects in the periodicity in both the Hermitian and non-Hermitian cases. In the non-Hermitian case, we provide a complete characterization of the edge modes.Keywordssubwavelength resonancesnon-Hermitian topological systemstopologically protected edge modesone-dimensional periodic chains of subwavelength resonatorsMSC codes35B3435P2535J0535C2046T2578A40

Topics & Concepts

Hermitian matrixEigenvalues and eigenvectorsDimension (graph theory)ResonatorPhysicsMatrix (chemical analysis)Enhanced Data Rates for GSM EvolutionMathematical analysisMathematicsQuantum mechanicsPure mathematicsOpticsMaterials scienceComputer scienceTelecommunicationsComposite materialGyrotron and Vacuum Electronics ResearchMicrowave Engineering and WaveguidesPhotonic and Optical Devices