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Autori principali: Ammari, Habib, Li, Bowen, Liu, Ping, Shao, Yingjie, Uhlmann, Alexander
Natura: Preprint
Pubblicazione: 2026
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Accesso online:https://arxiv.org/abs/2605.27572
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author Ammari, Habib
Li, Bowen
Liu, Ping
Shao, Yingjie
Uhlmann, Alexander
author_facet Ammari, Habib
Li, Bowen
Liu, Ping
Shao, Yingjie
Uhlmann, Alexander
contents We study scattering resonances of finite and infinite periodic two- and three-dimensional systems of high-contrast resonators beyond the subwavelength regime. Introducing frequency-dependent capacitance matrices, we derive quantitative asymptotic expansions of hybridized Fabry--Pérot resonant frequencies and their corresponding eigenmodes in terms of the material contrast parameter. We provide a partial differential equation (PDE) formulation of the frequency-dependent capacitance matrix analogous to the one for the capacitance matrix in the subwavelength regime. Based on this PDE formulation, we establish key properties of the frequency-dependent capacitance matrix and estimate its norm at high frequencies, substantiating the uniformity of our asymptotic expansions. For infinite periodic resonator arrays, we prove that they support bandgap opening and Dirac degeneracies at arbitrarily high frequencies. Our results extend the use of discrete approximations as a powerful tool for characterizing the resonant properties of finite and infinite periodic systems of high-contrast resonators at arbitrarily high frequencies and understanding their anomalous localization and transport properties arising from strong coupling to a discrete set of eigenfrequencies.
format Preprint
id arxiv_https___arxiv_org_abs_2605_27572
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Frequency-dependent capacitance matrix formulation for Fabry-Perot resonances in two and three dimensional systems
Ammari, Habib
Li, Bowen
Liu, Ping
Shao, Yingjie
Uhlmann, Alexander
Analysis of PDEs
We study scattering resonances of finite and infinite periodic two- and three-dimensional systems of high-contrast resonators beyond the subwavelength regime. Introducing frequency-dependent capacitance matrices, we derive quantitative asymptotic expansions of hybridized Fabry--Pérot resonant frequencies and their corresponding eigenmodes in terms of the material contrast parameter. We provide a partial differential equation (PDE) formulation of the frequency-dependent capacitance matrix analogous to the one for the capacitance matrix in the subwavelength regime. Based on this PDE formulation, we establish key properties of the frequency-dependent capacitance matrix and estimate its norm at high frequencies, substantiating the uniformity of our asymptotic expansions. For infinite periodic resonator arrays, we prove that they support bandgap opening and Dirac degeneracies at arbitrarily high frequencies. Our results extend the use of discrete approximations as a powerful tool for characterizing the resonant properties of finite and infinite periodic systems of high-contrast resonators at arbitrarily high frequencies and understanding their anomalous localization and transport properties arising from strong coupling to a discrete set of eigenfrequencies.
title Frequency-dependent capacitance matrix formulation for Fabry-Perot resonances in two and three dimensional systems
topic Analysis of PDEs
url https://arxiv.org/abs/2605.27572