English

Level Statistics and Localization for Two Interacting Particles in a Random Potential

Condensed Matter 2009-10-28 v1

Abstract

We consider two particles with a local interaction UU in a random potential at a scale L1L_1 (the one particle localization length). A simplified description is provided by a Gaussian matrix ensemble with a preferential basis. We define the symmetry breaking parameter μU2\mu \propto U^{-2} associated to the statistical invariance under change of basis. We show that the Wigner-Dyson rigidity of the energy levels is maintained up to an energy EμE_{\mu}. We find that Eμ1/μE_{\mu} \propto 1/\sqrt{\mu} when Γ\Gamma (the inverse lifetime of the states of the preferential basis) is smaller than Δ2\Delta_2 (the level spacing), and Eμ1/μE_{\mu} \propto 1/\mu when Γ>Δ2\Gamma > \Delta_2. This implies that the two-particle localization length L2L_2 first increases as U|U| before eventually behaving as U2U^2.

Keywords

Cite

@article{arxiv.cond-mat/9602004,
  title  = {Level Statistics and Localization for Two Interacting Particles in a Random Potential},
  author = {Dietmar Weinmann and Jean-Louis Pichard},
  journal= {arXiv preprint arXiv:cond-mat/9602004},
  year   = {2009}
}

Comments

4 pages REVTEX, 4 Figures EPS, UUENCODED