Local wellposedness of quasilinear Maxwell equations with conservative interface conditions

We establish a comprehensive local wellposedness theory for the quasilinear Maxwell system with interfaces in the space of piecewise $H^m$-functions for $m \geq 3$. The system is equipped with instantaneous and piecewise regular material laws and perfectly conducting interfaces and boundaries. We also provide a blow-up criterion in the Lipschitz norm and prove the continuous dependence on the data. The proof relies on precise a priori estimates and the regularity theory for the corresponding linear problem also shown here.

Keywords

nonlinear Maxwell system, perfectly conducting boundary/interface conditions, local wellposedness, blow-up criterion, continuous dependence, piecewise regular

2010 Mathematics Subject Classification

35L50, 35L60, 35Q61

Full Text (PDF format)

Received 21 January 2021

Received revised 22 February 2022

Accepted 21 March 2022

Published 29 November 2022