Transition from localized to extended eigenstates in the ensemble of power-law random banded matrices

Mirlin, A. D.; Fyodorov, Yan V.; Dittes, Frank-Michael; Quezada, Javier; Seligman, T. H.

doi:10.1103/physreve.54.3221

Cited by 396 publications

(618 citation statements)

References 33 publications

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“…The strength of the on-site interaction between different spins is |U|, with U < 0. To ensure that the effective model in the following stays well-defined in the L → ∞ limit, we limit our discussion to α > 1/2, in which case it has been known [13] that noninteracting 1D weakly disordered systems with hopping proportional to |l − m| −α mimics the properties of a short-range hopping system with d eff (α) = 2/(2α − 1) spatial dimensions.…”

Section: Methodsmentioning

confidence: 99%

Restoring Long-Range Order in One-Dimensional Superconductivity by Power-Law Hopping

Tezuka

Lobos²,

García-García³

2014

Proceedings of the International Conference on Strongly Correlated Electron Systems (SCES2013)

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Quantum fluctuations destroy phase coherence and thus long-range order in one-dimensional (1D) superconductivity as long as all interactions are short-ranged. Here we discuss the possibility of restoring phase coherence by power-law hopping. A 1D attractive-U Hubbard model with powerlaw hopping having the power-law exponent α is studied by Abelian bosonization and density-matrix renormalization group (DMRG). For 1/2 < α < 3/2, the system has an effective spatial dimensionality d eff > 1. We demonstrate that long-range superconducting order is restored for 1/2 < α < α c , with 5/4 < α c < 3/2. This conclusion is supported by a DMRG analysis of the model.

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Section: Methodsmentioning

confidence: 99%

Restoring Long-Range Order in One-Dimensional Superconductivity by Power-Law Hopping

Tezuka

Lobos²,

García-García³

2014

Proceedings of the International Conference on Strongly Correlated Electron Systems (SCES2013)

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“…Taking into account higher order terms in the gradient expansion (as in Ref. [23]), we find the following expression for A (2) 0 ,…”

Section: A Supersymmetric Nonlinear σ Modelmentioning

confidence: 99%

“…At the bulk the spectral correlations are not affected by the block structure and coincide with the nonchiral version of Eq. (3) which has been intensively studied in recent years [23,31]. In this section we study the localization properties at the origin by mapping the chRBM (3) onto a supersymmetric nonlinear σ model [16].…”

Section: The Chiral Rbm With Power-law Disordermentioning

confidence: 99%

“…[23]. By mapping the problem onto a nonlinear σ model with a nonlocal interaction, it was shown that for a 1/r band decay the eigenstates are multifractal and the spectral correlations resemble the ones at the Anderson transition.…”

Section: Introductionmentioning

confidence: 99%

“…Typical features include: scale invariant spectrum [20], level repulsion, and sub-Poisson number variance [21]. Different generalized random matrix model (gRMM) have been successfully employed to describe critical statistics [22,23].…”

Section: Introductionmentioning

confidence: 99%

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Long range disorder and Anderson transition in systems with chiral symmetry

García-García

Takahashi

2004

Nuclear Physics B

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We study the spectral properties of a chiral random banded matrix (chRBM) with elements decaying as a power-law Hij ∼ |i−j| −α . This model is equivalent to a chiral 1D Anderson Hamiltonian with long range power-law hopping. In the weak disorder limit we obtain explicit nonperturbative analytical results for the density of states (DoS) and the two-level correlation function (TLCF) by mapping the chRBM onto a nonlinear σ model. We also put forward, by exploiting the relation between the chRBM at α = 1 and a generalized chiral random matrix model, an exact expression for the above correlation functions. We give compelling analytical and numerical evidence that for this value the chRBM reproduces all the features of an Anderson transition. Finally we discuss possible applications of our results to quantum chromodynamics (QCD).

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Critical spectral statistics as the Luttinger liquid of energy levels at a finite temperature

Kravtsov

1999

Ann. Phys.

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We review the recent results on the energy level statistics in disordered conductors near the Anderson localization transition and other critical systems with multifractal eigenstates. We focus on the critical random matrix ensemble (CRMT) suggested by Mirlin and Fyodorov as a possible generic description of the critical parametric spectral statistics (CPSS). We show that in the region of large energy and/or parameter separations and weak multifractality this CRMT is equivalent to the Luttinger liquid of energy levels at a finite temperature with the interaction between the fictitious 1D fermions (energy levels) being dependent on the Dyson symmetry parameter β = 1, 2, 4 and the temperature being proportional to the multifractality exponent η = 1 − D2. We show that the CRMT is the simplest extension of the classical Wigner-Dyson random matrix ensemble for the case of finite dimensionless conductance g 1 and suggest the form of the two-level correlation functions for all the symmetry classes and all energy separations. We argue that these correlation functions coincide with the density correlation functions for the Calogero-Sutherland model at finite temperatures.

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Transition from localized to extended eigenstates in the ensemble of power-law random banded matrices

Cited by 396 publications

References 33 publications

Restoring Long-Range Order in One-Dimensional Superconductivity by Power-Law Hopping

Restoring Long-Range Order in One-Dimensional Superconductivity by Power-Law Hopping

Long range disorder and Anderson transition in systems with chiral symmetry

Critical spectral statistics as the Luttinger liquid of energy levels at a finite temperature

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