Abstract
We investigate the collective and single-particle excitations of an electron gas, quantum confined in a quasi-one-dimensional quantum-well wire, in the presence of a magnetic field. The calculations are done in the random-phase approximation with no further simplifying approximations. We derive analytical results for the dispersion relations of the intra- and intersubband magnetoplasmons. For large-magnetic fields the dispersion curves of the intersubband magnetoplasmons approach the frequencies of the principal and Bernstein modes of a two-dimensional electron gas, whereas the dispersion curve of the intrasubband magnetoplasmon tends to zero in this limit. It is shown that additional intersubband magnetoplasmons exist in comparison to a quasi-one-dimensional electron gas without a magnetic field and to a two-dimensional electron gas in the presence of a magnetic field. These magnetoplasmons have the character of confined modes with a vanishing depolarization shift for zero- and infinite-magnetic fields. With these modes it is possible to explain the resonance-splitting and fine-structure effects in the recently observed far-infrared transmission spectra. We interpret the complete spectrum of the quasi-one-dimensional magnetoplasmons by the hybridization of confined principal and Bernstein modes. This spectrum is universal, i.e., independent from the concrete shape of the lateral confining potential. © 1996 The American Physical Society.
- Received 12 September 1995
DOI:https://doi.org/10.1103/PhysRevB.54.8652
©1996 American Physical Society