Issues

 / 

2001

 / 

Supplement

  

Localization and quantum chaos


Density of states near the Anderson transition in the $(4-\varepsilon)$-dimensional space


Kapitza Institute of Physical Problems, Russian Academy of Sciences, ul. Kosygina 2, Moscow, 117334, Russian Federation

The calculation of the density of states for the Schrödinger equation with a Gaussian random potential is equivalent to the problem of a second-order transition with a ‘wrong’ sign of the coefficient of the quartic term in the Ginzburg–Landau Hamiltonian. The special role of the dimension $d=4$ for such Hamiltonian can be seen from different viewpoints but fundamentally is determined by the renormalizability of the theory. Construction of $\varepsilon$-expansion in direct analogy with the phase transitions theory gives rise to a problem of a ‘spurious’ pole. To solve this problem, the proper treatment of the factorial divergency of the perturbation series is necessary. In $(4-\varepsilon)$-dimensional theory, the terms of the leading order in $1/\varepsilon$ should be retained for $N\sim1$ ($N$ is an order of the perturbation theory) while all degrees of $1/\varepsilon$ are essential for large $N$ in view of the fast growth of their coefficients. The latter are calculated in the leading order in $N$ from the Callan–Symanzik equation with results of Lipatov method using as boundary conditions. The qualitative effect consists in shifting of the phase transition point to the complex plane. This results in elimination of the ‘spurious’ pole and in regularity of the density of states for all energies.

Fulltext pdf (167 KB)
Fulltext is also available at DOI: 10.1070/1063-7869/44/10S/S05
PACS: 72.15.−v, 72.15.Rn, 05.60.Gg, 05.45.Mt (all)
DOI: 10.1070/1063-7869/44/10S/S05
URL: https://ufn.ru/en/articles/2001/13/e/
Citation: Suslov I M "Density of states near the Anderson transition in the $(4-\varepsilon)$-dimensional space" Phys. Usp. 44 31–35 (2001)
BibTexBibNote ® (generic)BibNote ® (RIS)MedlineRefWorks

Îðèãèíàë: Suslov I M «Density of states near the Anderson transition in the $(4-\varepsilon)$-dimensional space» ÓÔÍ 171 31–35 (2001); DOI: 10.1070/1063-7869/44/10S/S05

Similar articles (3) ↓

  1. T.M. Fromhold, A.A. Krokhin et alChaotic quantum transport in superlatticesPhys. Usp. 44 24–27 (2001)
  2. F. Evers, A.D. Mirlin et alQuasiclassical memory effects: anomalous transport properties of two-dimensional electrons and composite fermions subject to a long-range disorderPhys. Usp. 44 27–31 (2001)
  3. M.V. Budantsev, Z.D. Kvon et alOrder, disorder and chaos in 2D lattice of coupled Sinai billiardsPhys. Usp. 44 20–24 (2001)

The list is formed automatically.

© 1918–2024 Uspekhi Fizicheskikh Nauk
Email: ufn@ufn.ru Editorial office contacts About the journal Terms and conditions