English

Localization for alloy-type models with non-monotone potentials

Mathematical Physics 2012-11-19 v1 math.MP Spectral Theory

Abstract

We consider a family of self-adjoint operators [H_\omega = - \Delta + \lambda V_\omega, \quad \omega \in \Omega = \bigtimes_{k \in \ZZ^d} \RR,] on the Hilbert space 2(\ZZd)\ell^2 (\ZZ^d) or L2(\RRd)L^2 (\RR^d). Here Δ\Delta denotes the Laplace operator (discrete or continuous), VωV_\omega is a multiplication operator given by the function V_\omega (x) = \sum_{k \in \ZZ^d} \omega_k u(x-k) on $\ZZ^d$, or \quad V_\omega (x) = \sum_{k \in \ZZ^d} \omega_k U(x-k) on $\RR^d$, and λ>0\lambda > 0 is a real parameter modeling the strength of the disorder present in the model. The functions u:\ZZd\RRu:\ZZ^d \to \RR and U:\RRd\RRU:\RR^d \to \RR are called single-site potential. Moreover, there is a probability measure \PP\PP on Ω\Omega modeling the distribution of the individual configurations ωΩ\omega \in \Omega. The measure \PP=k\ZZdμ\PP = \prod_{k \in \ZZ^d} \mu is a product measure where μ\mu is some probability measure on \RR\RR satisfying certain regularity assumptions. The operator on L2(\RRd)L^2 (\RR^d) is called alloy-type model, and its analogue on 2(\ZZd)\ell^2 (\ZZ^d) discrete alloy-type model. This thesis refines the methods of multiscale analysis and fractional moments in the case where the single-site potential is allowed to change its sign. In particular, we develop the fractional moment method and prove exponential localization for the discrete alloy-type model in the case where the support of uu is finite and uu has fixed sign at the boundary of its support. We also prove a Wegner estimate for the discrete alloy-type model in the case of exponentially decaying but not necessarily finitely supported single-site potentials. This Wegner estimate is applicable for a proof of localization via multiscale analysis.

Keywords

Cite

@article{arxiv.1211.3891,
  title  = {Localization for alloy-type models with non-monotone potentials},
  author = {Martin Tautenhahn},
  journal= {arXiv preprint arXiv:1211.3891},
  year   = {2012}
}

Comments

arXiv admin note: text overlap with arXiv:1011.5648, arXiv:0903.0492

R2 v1 2026-06-21T22:39:34.813Z