SCALING, DIFFUSION, AND THE INTEGER QUANTIZED HALL-EFFECT
The behavior of the two-particle spectral function, S(q), is examined in the hydrodynamic regime, at the mobility edge in a model for the integer quantized Hall effect. Results are presented from numerical diagonalization of the Hamiltonian for finite systems. For q2 small, S(q) has a conventional,...
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| Aineistotyyppi: | Journal article |
| Kieli: | English |
| Julkaistu: |
1988
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| Yhteenveto: | The behavior of the two-particle spectral function, S(q), is examined in the hydrodynamic regime, at the mobility edge in a model for the integer quantized Hall effect. Results are presented from numerical diagonalization of the Hamiltonian for finite systems. For q2 small, S(q) has a conventional, diffusive form. For q2 large, the novel dependence S(q,)±-±2q- 2+± is obtained, with ±=0.38±±0.04. © 1988 The American Physical Society. |
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