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Short-distance wavefunction statistics in one-dimensional Anderson localization.

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Short-distance wavefunction statistics in one-dimensional Anderson localization. / Schomerus, H.; Titov, M.
In: European Physical Journal B, Vol. 35, 2003, p. 421.

Research output: Contribution to Journal/MagazineJournal articlepeer-review

Harvard

Schomerus, H & Titov, M 2003, 'Short-distance wavefunction statistics in one-dimensional Anderson localization.', European Physical Journal B, vol. 35, pp. 421. <http://www.edpsciences.org/articles/epjb/abs/2003/19/b03392/b03392.html>

APA

Schomerus, H., & Titov, M. (2003). Short-distance wavefunction statistics in one-dimensional Anderson localization. European Physical Journal B, 35, 421. http://www.edpsciences.org/articles/epjb/abs/2003/19/b03392/b03392.html

Vancouver

Schomerus H, Titov M. Short-distance wavefunction statistics in one-dimensional Anderson localization. European Physical Journal B. 2003;35:421.

Author

Schomerus, H. ; Titov, M. / Short-distance wavefunction statistics in one-dimensional Anderson localization. In: European Physical Journal B. 2003 ; Vol. 35. pp. 421.

Bibtex

@article{420050949e87404790838dcd11f99a7a,
title = "Short-distance wavefunction statistics in one-dimensional Anderson localization.",
abstract = "We investigate the short-distance statistics of the local density of states nu in long one-dimensional disordered systems, which display Anderson localization. It is shown that the probability distribution function P(nu) can be recovered from the long-distance wavefunction statistics, if one also uses parameters that are irrelevant from the perspective of two-parameter scaling theory.",
author = "H. Schomerus and M. Titov",
year = "2003",
language = "English",
volume = "35",
pages = "421",
journal = "European Physical Journal B",
issn = "1434-6036",
publisher = "Springer New York LLC",

}

RIS

TY - JOUR

T1 - Short-distance wavefunction statistics in one-dimensional Anderson localization.

AU - Schomerus, H.

AU - Titov, M.

PY - 2003

Y1 - 2003

N2 - We investigate the short-distance statistics of the local density of states nu in long one-dimensional disordered systems, which display Anderson localization. It is shown that the probability distribution function P(nu) can be recovered from the long-distance wavefunction statistics, if one also uses parameters that are irrelevant from the perspective of two-parameter scaling theory.

AB - We investigate the short-distance statistics of the local density of states nu in long one-dimensional disordered systems, which display Anderson localization. It is shown that the probability distribution function P(nu) can be recovered from the long-distance wavefunction statistics, if one also uses parameters that are irrelevant from the perspective of two-parameter scaling theory.

M3 - Journal article

VL - 35

SP - 421

JO - European Physical Journal B

JF - European Physical Journal B

SN - 1434-6036

ER -