Superluminal localized solutions to Maxwell equations propagating along a waveguide: The finite-energy case

The electrodynamics of a nonlinear, complex scalar field is developed from the basis of a Hamiltonian formalism. By means of a canonical transformation, the equations for a stationary state are reduced to the consideration of an equivalent problem in static equilibrium. Localized solutions are defined. For specified conditions on the self-interaction, solutions of finite energy, and finite, nonzero charge, are localized.

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SUPERLUMINAL LOCALIZED SOLUTIONS TO THE MAXWELL EQUATIONS FOR VACUUM AND FOR DISPERSIVE MEDIA (WITH ARBITRARY FREQUENCIES AND BANDWIDTHS)

Free and Guided Optical Beams ◽

10.1142/9789812702531_0019 ◽

2004 ◽

Author(s):

MICHEL ZAMBONI RACHED ◽

K. Z. NÓBREGA ◽

ERASMO RECAMI

Keyword(s):

Maxwell Equations ◽

Dispersive Media ◽

Localized Solutions

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Regularizing effect for a system of Schrödinger–Maxwell equations

Advances in Calculus of Variations ◽

10.1515/acv-2016-0006 ◽

2018 ◽

Vol 11 (1) ◽

pp. 75-87 ◽

Cited By ~ 5

Author(s):

Lucio Boccardo ◽

Luigi Orsina

Keyword(s):

Elliptic Equations ◽

Maxwell Equations ◽

Dual Space ◽

Finite Energy ◽

Existence Results ◽

Energy Solution ◽

Maxwell System ◽

Finite Energy Solution

AbstractWe prove some existence results for the following Schrödinger–Maxwell system of elliptic equations:\left\{\begin{aligned} &\displaystyle{-}\div(M(x)\nabla u)+A\varphi|u|^{r-2}u=% f,&&\displaystyle u\in W_{0}^{1,2}(\Omega),\\ &\displaystyle{-}\div(M(x)\nabla\varphi)=|u|^{r},&&\displaystyle\varphi\in W_{% 0}^{1,2}(\Omega).\end{aligned}\right.In particular, we prove the existence of a finite energy solution {(u,\varphi)} if {r>2^{*}} and f does not belong to the “dual space” {L^{\frac{2N}{N+2}}(\Omega)}.

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Are Maxwell knots integrable?

The European Physical Journal C ◽

10.1140/epjc/s10052-020-08745-7 ◽

2020 ◽

Vol 80 (12) ◽

Author(s):

A. Morozov ◽

N. Tselousov

Keyword(s):

Limit Cycles ◽

Maxwell Equations ◽

Poynting Vector ◽

Measure Zero ◽

Finite Energy ◽

Link Invariant ◽

Integral Of Motion ◽

Integrable Structure ◽

Field Lines ◽

Knots And Links

AbstractWe review properties of the null-field solutions of source-free Maxwell equations. We focus on the electric and magnetic field lines, especially on limit cycles, which actually can be knotted and/or linked at every given moment. We analyse the fact that the Poynting vector induces self-consistent time evolution of these lines and demonstrate that the Abelian link invariant is integral of motion. We also consider particular examples of the field lines for the particular family of finite energy source-free “knot” solutions, attempting to understand when the field lines are closed – and can be discussed in terms of knots and links. Based on computer simulations we conjecture that Ranada’s solution, where every pair of lines forms a Hopf link, is rather exceptional. In general, only particular lines (a set of measure zero) are limit cycles and represent closed lines forming knots/links, while all the rest are twisting around them and remain unclosed. Still, conservation laws of Poynting evolution and associated integrable structure should persist.

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