A note on magnetic-field induced level-density condensation in a two-dimensional electron gas with point scatterers
Abstract
The density-of-states (DOS) for a magnetized (B) two-dimensional electron gas (2DEG) containing point scatterers of arbitrary strengths, concentration (ns) and distribution is analyzed. It is shown from the first principles that for \(ns ≤ B/Φo nB\), the areal density of flux quanta \(Φo hc/e\), the DOS retains the extensive degeneracy characteristic of the Landau levels, but reduced by a factor \((1 - ns/nB)\). This elementary but exact result gives a level condensation for magnetic field \(B > nsΦo\), as first noted by Brézin et al.. Its implications for the Integral Quantum Hall Effect and for Random Matrix Theory are pointed out.
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