Elliptical trajectories of a point on the elliptical 2-sphere

Abstract

The focus of this work is to analyze the trajectories of a point on the ellipsoid Sa1,a2,a32 while it is under the influence of a Killing vector field K. For this purpose, we introduce the generalized Darboux frame and the variational vector fields of Sa1,a2,a32. Then, we determine the Killing equations in terms of the Darboux frame invariants along an ellipsoidal curve. The Killing equations make it possible for us to interpret the magnetic trajectory of a point on the ellipsoid Sa1,a2,a32. Then, we determine two special trajectories using the variational method. The first one is magnetic curves that are the trajectories produced by the Killing magnetic field K are satisfied the following Lorentz force equation FL (t)=K× Et=∇ Tt, where × E is elliptical cross product and ∇ is the Levi-Civita connection of the ellipsoid Sa1,a2,a32. The second one is generalized magnetic helices that are trajectories described by the trajectory of a point on a great ellipse of the ellipsoid rolling without slipping on a fixed ellipse of the ellipsoid using the elliptical motion on the Sa1,a2,a32. Furthermore, we give various examples and visualized them with the program Mathematica.