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UID:20250707T105857EDT-4469VHUEon@132.216.98.100
DTSTAMP:20250707T145857Z
DESCRIPTION:Title: On rotationally invariant (super)integrability with magn
 etic fields in 3D\n\nAbstract: Superintegrable Hamiltonian systems possess
  remarkable properties from a physical and mathematical point of view. To 
 obtain these systems\, one can start from integrable systems and look for 
 additional integrals of motion. We will consider 3D Hamiltonian systems ad
 mitting a nonzero magnetic field\, and more precisely\, we will focus on s
 uch systems that possess two quadratic integrals of motion of nonsubgroup 
 type\, where one of them has its leading order term in angular momentum. I
 f the magnetic field is set to zero\, it leads to the three cases that all
 ow separation of the Hamilton-Jacobi or Schrödinger equations in the circu
 lar parabolic\, prolate and oblate spheroidal coordinates. In addition\, w
 e will provide some superintegrable systems\, mainly for the circular para
 bolic case.\n\n \n
DTSTART:20190910T193000Z
DTEND:20190910T203000Z
LOCATION:Room 4336\, CA\, Pav. André-Aisenstadt\, 2920\, ch. de la Tour
SUMMARY:Sébastien Bertrand\, Czech Technical University\, Department of Phy
 sics\, Prague
URL:/mathstat/channels/event/sebastien-bertrand-czech-
 technical-university-department-physics-prague-300476
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