EXTENDED STATES IN A ONE-DIMENSIONAL DISORDERED SYSTEM
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Abstract
A one-dimensional system with only off-diagonal disorder in which the absolute values of all the off-diagonal matrix elements are equal to a constant is studied with the renormalization group decimation method. It proves that all the eigenstates in the system are extended, regardless of the probability of the off-diagonal matrix elements being positive(or negative).
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Cite this article:
TAN Weichao. EXTENDED STATES IN A ONE-DIMENSIONAL DISORDERED SYSTEM[J]. Chin. Phys. Lett., 1989, 6(1): 31-34.
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TAN Weichao. EXTENDED STATES IN A ONE-DIMENSIONAL DISORDERED SYSTEM[J]. Chin. Phys. Lett., 1989, 6(1): 31-34.
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TAN Weichao. EXTENDED STATES IN A ONE-DIMENSIONAL DISORDERED SYSTEM[J]. Chin. Phys. Lett., 1989, 6(1): 31-34.
|
TAN Weichao. EXTENDED STATES IN A ONE-DIMENSIONAL DISORDERED SYSTEM[J]. Chin. Phys. Lett., 1989, 6(1): 31-34.
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