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We consider an interacting two-dimensional electron system, with a uniform positive background, in a strong perpendicular magnetic field at zero temperature, under conditions where an integral number of Landau levels are filled and the Coulomb energy e^{2}{l₀} is smaller than the cyclotron energy ₂. The elementary neutral excitations may be described alternatively as magnetoplasma modes, or as magnetic excitons---i. e. , a bound state of a hole in a filled Landau level and one electron in an otherwise empty level---and they are characterized by a conserved wave vector k. The dispersion relations may be calculated exactly, to first order in ({e^{2}{l₀) }}{₂}, for the lowest magnetoplasmon band, which comes in to the cyclotron frequency at k=0. We also calculate the spin-wave dispersion relations for the case where one spin state of a Landau level is completely occupied, and we discuss qualitatively the exciton spectrum for a partially filled Landau level, under the conditions of the fractional quantized Hall effect.
Kallin et al. (Thu,) studied this question.