BibTeX
CSL-JSON
MLA
Harvard
Diffraction of Bloch Wave Packets for Maxwell's Equations
release_hp5hjsupgbhqpmyz3kajdbh24a
by
Grégoire Allaire,
Mariapia Palombaro,
Jeffrey Rauch
Released
as a article
.
2013
Abstract
We study, for times of order 1/h, solutions of Maxwell's equations in an
O(h^2) modulation of an h-periodic medium. The solutions are of slowly varying
amplitude type built on Bloch plane waves with wavelength of order h. We
construct accurate approximate solutions of three scale WKB type. The leading
profile is both transported at the group velocity and dispersed by a
Schr\"odinger equation given by the quadratic approximation of the Bloch
dispersion relation. A weak ray average hypothesis guarantees stability.
Compared to earlier work on scalar wave equations, the generator is no longer
elliptic. Coercivity holds only on the complement of an infinite dimensional
kernel. The system structure requires many innovations.
In text/plain format
Archived Files and Locations
application/pdf
408.6 kB
file_wgswuvntprguplv3jn6yluxdee
|
arxiv.org (repository) web.archive.org (webarchive) |
Read Archived PDF
Preserved and Accessible
arXiv
1202.6549v2
Work Entity
access all versions, variants, and formats of this works (eg, pre-prints)
access all versions, variants, and formats of this works (eg, pre-prints)
Cite This
Lookup Links