An Infinite Family of Maximally Superintegrable Systems in a Magnetic Field with Higher Order Integrals

Abstract: We construct an additional independent integral of motion for a class of three dimensional minimally superintegrable systems with constant magnetic field. This class was introduced in [J. Phys. A: Math. Theor. 50 (2017), 245202, 24 pages] and it is known to possess periodic closed orbits. In the present paper we demonstrate that it is maximally superintegrable. Depending on the values of the parameters of the system, the newly found integral can be of arbitrarily high polynomial order in momenta.

“…Let us also point out that if V 1 (x 1 ) = 0, for constant magnetic field a rotation around x 2 brings the system (7) into (9). Thus, what we will deduce in the following for V 1 = 0 applies also for (9).…”

“…Above we have provided a complete answer to the problem of quadratic superintegrability for the considered classes of systems (7) and (9). As we have seen, maximal superintegrability via at most quadratic integrals is very rare in the presence of magnetic field, as opposed to numerous purely scalar maximally superintegrable systems discussed e.g.…”

“…A more general 3D infinite family of maximally superintegrable system, including the previous cases (30) and (33) and the one found in [9], corresponds to the caged oscillator…”

“…The study of superintegrability with magnetic fields was initiated in [1] and subsequently followed in both two spatial dimensions [2,3,4,5] and three spatial dimensions [6,7,8,9,10]. Also a relativistic version of the problem was recently considered, cf.…”

“…With these simplifications at hand, the determining equations for the integral can be solved. In section 9.1 we list the superintegrable systems so found; their explicit derivation is rather technical and tedious and we review it in appendices A, B and C. The special case in which the magnetic field is constant and the functions V j in (7) and (9) are at most quadratic polynomials is studied in section 8. Finally, in section 9.2 we discuss the approaches to construction of higher order integrals.…”

Classical Superintegrable Systems in a Magnetic Field that Separate in Cartesian Coordinates

“…Let us also point out that if V 1 (x 1 ) = 0, for constant magnetic field a rotation around x 2 brings the system (7) into (9). Thus, what we will deduce in the following for V 1 = 0 applies also for (9).…”

“…Above we have provided a complete answer to the problem of quadratic superintegrability for the considered classes of systems (7) and (9). As we have seen, maximal superintegrability via at most quadratic integrals is very rare in the presence of magnetic field, as opposed to numerous purely scalar maximally superintegrable systems discussed e.g.…”

“…A more general 3D infinite family of maximally superintegrable system, including the previous cases (30) and (33) and the one found in [9], corresponds to the caged oscillator…”

“…The study of superintegrability with magnetic fields was initiated in [1] and subsequently followed in both two spatial dimensions [2,3,4,5] and three spatial dimensions [6,7,8,9,10]. Also a relativistic version of the problem was recently considered, cf.…”

“…With these simplifications at hand, the determining equations for the integral can be solved. In section 9.1 we list the superintegrable systems so found; their explicit derivation is rather technical and tedious and we review it in appendices A, B and C. The special case in which the magnetic field is constant and the functions V j in (7) and (9) are at most quadratic polynomials is studied in section 8. Finally, in section 9.2 we discuss the approaches to construction of higher order integrals.…”

Classical Superintegrable Systems in a Magnetic Field that Separate in Cartesian Coordinates

CN-Smorodinsky–Winternitz system in a constant magnetic field

Cylindrical first-order superintegrability with complex magnetic fields