Tunable magnetic phases in quasi-one-dimensional systems

Alfredo X. Sánchez, Jean-Pierre Leburton

Published 2015-02-05Version 1

There has been considerable debate on the onset of exotic spin phenomena in quantum wires due to enhanced many-body effects caused by the one-dimensional (1D) alignment of charge carriers. We explain various observed spin effects, such as a carrier density-dependent spin-flip in dilute quasi-1D systems and the variability of the spin polarization in quantum point contacts, by using an unrestricted Hartree-Fock approach with a three-dimensional (3D) Coulomb interaction. The model dimensionality is critical in identifying a complex pattern of magnetic phases varying with confinement and magnetic field. In the limit of vanishing magnetic fields, we show the emergence of a degenerate excited state with opposite spin polarization above a confinement-dependent 1D concentration threshold, which is consistent with observations of a conductance plateau at half the conductance quantum $G_{0}/2=e^{2}/h$, even in the absence of spin-orbit interactions. Moreover, spin polarization disappears in highly-asymmetrically confined wires, and strictly two-dimensional systems.