Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
9953928 | Annals of Physics | 2018 | 50 Pages |
Abstract
This paper systematically develops the Schrödinger formalism that is valid also for gyrotropic media where the material weights W=εÏÏâμâ W¯are complex. This is a non-trivial extension of the Schrödinger formalism for non- gyrotropic media (where W=W¯) that has been known since at least the 1960s (Wilcox, 1966; Kato, 1967). Here, Maxwell's equations are rewritten in the form iâtΨ=MΨ where the selfadjoint (hermitian) Maxwell operatorM=Wâ1Rot|Ïâ¥0=Mâ takes the place of the Hamiltonian and Ψ is a complex wave representing the physical field (E,H)=2ReΨ. Writing Maxwell's equations in Schrödinger form gives us access to the rich toolbox of techniques initially developed for quantum mechanics and allows us to apply them to classical waves. To show its utility, we explain how to identify conserved quantities in this formalism. Moreover, we sketch how to extend our ideas to other classical waves.
Related Topics
Physical Sciences and Engineering
Physics and Astronomy
Physics and Astronomy (General)
Authors
Giuseppe De Nittis, Max Lein,