In this thesis we consider the motion of a charged particle in strong electromagnetic
background elds, having in mind applications to state-of-the-art
high-power lasers. To nd solutions of the Lorentz force equation of motion,
we make use of Noether's theorem to identify conserved quantities of the
charge dynamics. We will explain how, given enough symmetries, a dynamical
system becomes integrable or, with a maximum number of conserved
quantities, maximally superintegrable. Beginning with charged particles in
vector background elds, we shall show that the relevant symmetry group is
the Poincar e group. The dynamics for constant and univariate elds is classi
ed, and their integrability properties are clari ed. We then move on to
the problem of a particle in a scalar background eld and show that the symmetry
group is extended to the conformal group. We then present examples
of elds which include Poincar e, dilation and special conformal symmetries
leading to varying extents of integrability.
Date of Award | 2019 |
---|
Original language | English |
---|
Awarding Institution | |
---|
Supervisor | Tom Heinzl (Other Supervisor) |
---|
- Charge motion
- Strong fields
- Theoretical physics
Relativistic Charge Dynamics in Electromagnetic Fields
Ansell, L. (Author). 2019
Student thesis: PhD