Landau quantization for an electric quadrupole moment of position-dependent mass quantum particles interacting with electromagnetic fields.

Analogous to Landau quantization related to a neutral particle possessing an electric quadrupole moment, we generalize such a Landau quantization to include position-dependent mass (PDM) neutral particles. Using cylindrical coordinates, the exact solvability of PDM neutral particles with an electric quadrupole moment moving in electromagnetic fields is reported. The interaction between the electric quadrupole moment of a PDM neutral particle and a magnetic field in the absence of an electric field is analyzed for two different radial cylindrical PDM settings. Next, two particular cases of radial electric fields (E ⃗ = λ ρ ρ ̂ a n d E ⃗ = λ ρ 2 ρ ̂) are considered to investigate their influence on the Landau quantization (of this system using the same models of PDM settings). The exact eigenvalues and eigenfunctions for each case are analytically obtained. • Quantum mechanical systems with position-dependent mass (PDM). • The PDM-minimal-coupling and the PDM-momentum operator. • Position-dependent-mass charged particles in position-dependent magnetic fields. • The quantum mechanical effects on PDM neutral particles possessing an electric quadrupole moment. • Landau quantization for PDM neutral particles possessing an electric quadrupole moment interacting with external fields (electric and magnetic fields). [ABSTRACT FROM AUTHOR]