Asymptotic structure of the spectrum in a Dirichlet-strip with double periodic perforations

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URI: http://hdl.handle.net/10902/18156
ISSN: 1556-1801
ISSN: 1556-181X
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Autoría
Nazarov, Sergei A.; Orive-Illera, Rafael; Pérez Martínez, María EugeniaAutoridad Unican
Fecha
2019-10-31
Derechos
© American Institute of Mathematical Sciences. This is a pre-copy-editing, author-produced PDF of an article accepted for publication in [Networks and Heterogeneous Media] following peer review. The definitive publisher-authenticated version [Sergei A. Nazarov, Rafael Orive-Illera, María-Eugenia Pérez-Martínez. Asymptotic structure of the spectrum in a Dirichlet-strip with double periodic perforations. Networks & Heterogeneous Media, 2019, 14 (4) : 733-757. doi: 10.3934/nhm.2019029] is available online at:https://www.aimsciences.org/article/doi/10.3934/nhm.2019029
Publicado en
Networks and Heterogeneous Media ; Volume 14, Issue 4, 1 December 2019, Pages 733-757
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American Institute of Mathematical Sciences
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Palabras clave
Band-gap structure
Spectral perturbations
Homogenization
Perforated media
Double periodicity
Dirichlet-Laplace operator
Resumen/Abstract
We address a spectral problem for the Dirichlet-Laplace operator in a waveguideis obtained from repsilon an unbounded two-dimensional strip ?? which is periodically perforated by a family of holes, which are also periodically distributed along a line, the so-called "perforation string". We assume that the two periods are different, namely, O(1)O(1) and O(?)O(?) respectively, where 0<??10<??1. We look at the band-gap structure of the spectrum . We derive asymptotic formulas for the endpoints of the spectral bands and show that has a large number of short bands of length ) which alternate with wide gaps of width O(1)O(1).
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