Schulz-Baldes H (2004)
Publication Type: Journal article
Publication year: 2004
Publisher: Springer Verlag (Germany)
Book Volume: 14
Pages Range: 1089-1117
URI: http://de.arxiv.org/abs/math-ph/0405018
DOI: 10.1007/s00039-004-0484-5
It is proven that the inverse localization length of an Anderson model on a strip of width L is bounded above by L/λ2 for small values of the coupling constant λ of the disordered potential. For this purpose, a formalism is developed in order to calculate the bottom Lyapunov exponent associated with random products of large symplectic matrices perturbatively in the coupling constant of the randomness.
APA:
Schulz-Baldes, H. (2004). Perturbation theory for Lyapunov exponents of an Anderson model on a strip. Geometric and Functional Analysis, 14, 1089-1117. https://doi.org/10.1007/s00039-004-0484-5
MLA:
Schulz-Baldes, Hermann. "Perturbation theory for Lyapunov exponents of an Anderson model on a strip." Geometric and Functional Analysis 14 (2004): 1089-1117.
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