Quantum features of a charged particle in ionized plasma controlled by a time-dependent magnetic field

Quantum characteristics of a charged particle traveling under the influence of an external time-dependent magnetic field in ionized plasma are investigated using the invariant operator method. The Hamiltonian that gives the radial part of the classical equation of motion for the charged particle is dependent on time. The corresponding invariant operator that satisfies Liouville-von Neumann equation is constructed using fundamental relations. The exact radial wave functions are derived by taking advantage of the eigenstates of the invariant operator. Quantum properties of the system is studied using these wave functions. Especially, the time behavior of the radial component of the quantized energy is addressed in detail.

[1]  H. Polat,et al.  Time dependent magnetic field effects on the±J Ising model , 2013, 1303.3702.

[2]  J. Choi,et al.  Nonclassical Properties of Superpositions of Coherent and Squeezed States for Electromagnetic Fields in Time-Varying Media , 2012 .

[3]  S. Lyagushyn Quantum Optics and Laser Experiments , 2012 .

[4]  R. K. Singh,et al.  Effect of a transverse magnetic field on the plume emission in laser-produced plasma: An atomic analysis , 2010 .

[5]  M. A. Lohe Exact time dependence of solutions to the time-dependent Schrödinger equation , 2009 .

[6]  E. Posada,et al.  Effects of an external magnetic field in pulsed laser deposition , 2008 .

[7]  R. Sever,et al.  Polynomial solutions of the Mie-type potential in the D-dimensional Schrödinger equation , 2008 .

[8]  M. S. Abdalla,et al.  Propagator for the time-dependent charged oscillator via linear and quadratic invariants , 2007 .

[9]  R. Sever,et al.  Exact polynomial eigensolutions of the Schrodinger equation for the pseudoharmonic potential , 2006, quant-ph/0611183.

[10]  D. Laroze,et al.  An exact solution for electrons in a time-dependent magnetic field , 2006 .

[11]  S. S. Harilal,et al.  Debris mitigation in a laser-produced tin plume using a magnetic field , 2005 .

[12]  F. Najmabadi,et al.  Confinement and dynamics of laser-produced plasma expanding across a transverse magnetic field. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[13]  J. Choi,et al.  OPERATOR METHOD FOR A NONCONSERVATIVE HARMONIC OSCILLATOR WITH AND WITHOUT SINGULAR PERTURBATION , 2002 .

[14]  M. Maamache,et al.  Evolution of Gaussian wave packet and nonadiabatic geometrical phase for the time-dependent singular oscillator , 2002, quant-ph/0204132.

[15]  H. R. Lewis,et al.  Reduction method for the linear quantum or classical oscillator with time-dependent frequency, damping, and driving , 1999 .

[16]  D. Trifonov Exact solutions for the general nonstationary oscillator with a singular perturbation , 1998, quant-ph/9811081.

[17]  J. Lewins Conservation of angular momentum in a varying magnetic field , 1998 .

[18]  James G. Lunney,et al.  Pulsed laser deposition of particulate-free thin films using a curved magnetic filter , 1997 .

[19]  J. Lewins On the motion of charged particles in a varying magnetic field , 1995 .

[20]  H. Dekker Classical and quantum mechanics of the damped harmonic oscillator , 1981 .

[21]  I. Malkin,et al.  EVEN AND ODD COHERENT STATES AND EXCITATIONS OF A SINGULAR OSCILLATOR , 1974 .

[22]  H. R. Lewis,et al.  An Exact Quantum Theory of the Time‐Dependent Harmonic Oscillator and of a Charged Particle in a Time‐Dependent Electromagnetic Field , 1969 .

[23]  J. Lewis Classical and Quantum Systems with Time-Dependent Harmonic-Oscillator-Type Hamiltonians , 1967 .

[24]  John Ellis,et al.  Int. J. Mod. Phys. , 2005 .

[25]  T. Park Canonical Transformations for Time-Dependent Harmonic Oscillators , 2004 .

[26]  J. Choi,et al.  Propagator and geometric phase of a general time-dependent harmonic oscillator , 2003 .

[27]  Y. Tatematsu,et al.  Cyclotron emission spectra from collisionless electrons resonantly heated by cyclotron waves in a magnetic mirror , 2001 .

[28]  I. Malkin,et al.  Coherent states and transition probabilities in a time dependent electromagnetic field , 1970 .