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Global existence and regularity of solutions to a system of nonlinear Maxwell equations

✍ Scribed by Habib Ammari; Kamel Hamdache

Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
229 KB
Volume
286
Category
Article
ISSN
0022-247X

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✦ Synopsis

We consider the model that has been suggested by Greenberg et al. (Physica D 134 (1999) 362-383) for the ferroelectric behavior of materials. In this model, the usual (linear) Maxwell's equations are supplemented with a constitutive relation in which the electric displacement equals a constant times the electric field plus an internal polarization variable which evolves according to an internal set of nonlinear Maxwell's equations. For such model we provide rigorous proofs of global existence, uniqueness, and regularity of solutions. We also provide some preliminary results on the long-time behavior of solutions. The main difficulties in this study are due to the loss of compactness in the system of Maxwell's equations. These results generalize those of Greenberg et al., where only solutions with TM (transverse magnetic) symmetry were considered.

πŸ“œ SIMILAR VOLUMES

Existence and regularity of a weak solut
Existence and regularity of a weak solution to Maxwell's equations with a thermal effect
✍ Hong-Ming Yin πŸ“‚ Article πŸ“… 2006 πŸ› John Wiley and Sons 🌐 English βš– 128 KB

## Abstract This paper deals with Maxwell's equations with a thermal effect, where the electric conductivity strongly depends on the temperature. It is shown that the coupled system has a global weak solution and the temperature is HΓΆlder continuous if the conductivity decays suitably as temperatur