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Communications in Mathematical Sciences
Volume 20 (2022)
Number 4
Quantitative spectral analysis of electromagnetic scattering. II: Evolution semigroups and non-perturbative solutions
Pages: 1025 – 1046
DOI: https://dx.doi.org/10.4310/CMS.2022.v20.n4.a4
Author
Abstract
We carry out quantitative studies on the Green operator $\mathscr{\hat{G}}$ associated with the Born equation, an integral equation that models electromagnetic scattering, building the strong stability of the evolution semigroup $\lbrace \exp (i \tau G\mathscr{\hat{G}}) \vert \tau \geq 0 \rbrace$ on polynomial compactness and the Arendt–Batty–Lyubich–Vũ theorem. The strongly-stable evolution semigroup inspires our proposal of a nonperturbative method to solve the light scattering problem and improve the Born approximation.
Keywords
electromagnetic scattering, Green operator, evolution semigroup, strong stability, non-perturbative solution
2010 Mathematics Subject Classification
35Q61, 45E99, 47B38, 47D06, 78A45
This research was supported in part by the Applied Mathematics Program within the Department of Energy (DOE) Office of Advanced Scientific Computing Research (ASCR) as part of the Collaboratory on Mathematics for Mesoscopic Modeling of Materials (CM4).
Received 7 January 2021
Received revised 12 October 2021
Accepted 25 October 2021
Published 11 April 2022