Numerical Approximation of Asymptotically Disappearing Solutions of Maxwell's Equations.

Adler, James H.
Petkov, Veselin.
Zikatanov, Ludmil.
2013.

This work is on the numerical approximation of incoming solutions to Maxwell's equations with dissipative boundary conditions, whose energy decays exponentially with time. Such solutions are called asymptotically disappearing (ADS) and they play an important role in inverse back-scattering problems. The existence of ADS is a difficult mathematical problem. For the exterior of a sphere, such soluti... read more

Subjects
Maxwell equations.
Tufts University. Department of Mathematics.
Permanent URL
http://hdl.handle.net/10427/012378
Original publication
J. H. Adler, V. M. Petkov, L. T. Zikatanov. Numerical Approximation of Asymptotically Disappearing Solutions of Maxwell's Equations. SIAM J. Sci. Comput. (SISC), 35(5):S386-S401, 2013. DOI:10.1137/120879385.
ID: tufts:22275
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