Effects on the Non-Relativistic Dynamics of a Charged Particle Interacting with a Chern-Simons Potential

Abstract

The hydrogen atom in two dimensions, described by a Schr\"odinger equation with a Chern-Simons potential, is numerically solved. Both its wave functions and eigenvalues were determined for small values of the principal quantum number n. The only possible states correspond to l=0. How the result depends on the topological mass of the photon is also discussed. In the case n=1, the energy of the fundamental state corresponding to different choice for the photon mass scale are found to be comprehended in the interval -3,5 × 10-3 eV ≤ E ≤ -9,0 × 10-2 eV, corresponding to a mean radius of the electron in the range (5.637 0.005) × 10-8~cm ≤ <r> ≤ (48.87 0.03) × 10-8~cm. In any case, the planar atom is found to be very weekly bounded showing some features similar to the Rydberg atoms in three dimensions with a Coulombian interaction.