Optimal Wegner estimate and the density of states for N-body, interacting Schrodinger operators with random potentials

We prove an optimal one-volume Wegner estimate for interacting systems of $N$ quantum particles moving in the presence of random potentials. The proof is based on the scale-free unique continuation principle recently developed for the 1-body problem by Rojas-Molina and Veseli\`c \cite{RM-V1} and extended to spectral projectors by Klein \cite{klein1}. These results extend of our previous results in \cite{CHK:2003,CHK:2007}. We also prove a two-volume Wegner estimate as introduced in \cite{chulaevsky-suhov1}. The random potentials are generalized Anderson-type potentials in each variable with minimal conditions on the single-site potential aside from positivity. Under additional conditions, we prove the Lipschitz continuity of the integrated density of states (IDS) This implies the existence and local finiteness of the density of states. We also apply these techniques to interacting $N$-particle Schr\"odinger operators with Delone-Anderson type random external potentials.

[1]  A. Klein,et al.  Bootstrap multiscale analysis and localization for multi-particle continuous Anderson Hamiltonians , 2013, 1311.4220.

[2]  A. Klein,et al.  The Bootstrap Multiscale Analysis for the Multi-particle Anderson Model , 2012, 1212.5638.

[3]  Constanza Rojas-Molina,et al.  Scale-Free Unique Continuation Estimates and Applications to Random Schrödinger Operators , 2012, 1210.5623.

[4]  A. Klein Unique Continuation Principle for Spectral Projections of Schrödinger Operators and Optimal Wegner Estimates for Non-ergodic Random Schrödinger Operators , 2012, Communications in Mathematical Physics.

[5]  A. Klein,et al.  A comprehensive proof of localization for continuous Anderson models with singular random potentials , 2011, 1105.0213.

[6]  A. B. D. Monvel,et al.  Dynamical localization for a multi-particle model with an alloy-type external random potential , 2011 .

[7]  F. Klopp,et al.  The Integrated Density of States for an Interacting Multiparticle Homogeneous Model and Applications to the Anderson Model , 2009 .

[8]  A. B. D. Monvel,et al.  Wegner-type Bounds for a Multi-particle Continuous Anderson Model with an Alloy-type External Potential , 2008, 0812.2621.

[9]  Y. Suhov,et al.  Multi-particle Anderson Localisation: Induction on the Number of Particles , 2008, 0811.2530.

[10]  Y. Suhov,et al.  Eigenfunctions in a Two-Particle Anderson Tight Binding Model , 2008, 0810.2190.

[11]  M. Aizenman,et al.  Localization Bounds for Multiparticle Systems , 2008, 0809.3436.

[12]  Y. Suhov,et al.  Wegner Bounds for a Two-Particle Tight Binding Model , 2007, 0708.2056.

[13]  W. Kirsch A Wegner estimate for multi-particle random Hamiltonians , 2007, 0704.2664.

[14]  J. Combes,et al.  An optimal Wegner estimate and its application to the global continuity of the integrated density of states for random Schrödinger operators , 2006, math-ph/0605029.

[15]  A. Iwatsuka,et al.  The uniqueness of the integrated density of states for the Schrödinger operators with magnetic fields , 2001 .

[16]  R. Carmona,et al.  Spectral Theory of Random Schrödinger Operators , 1990 .