Multi-particle localization at low energy for the multi-dimensional continuous Anderson model

We study the multi-particle Anderson model in the continuum and show that under some mild assumptions on the random external potential and the inter-particle interaction, for any finite number of particles, the multi-particle lower edges of the spectrum are almost surely constant in absence of ergodicity. We stress that this result is not quite obvious and has to be handled carefully. In addition, we prove the spectral exponential and the strong dynamical localization of the continuous multi-particle Anderson model at low energy. The proof based on the multi-particle multi-scale analysis bounds, needs the values of the external random potential to be independent and identically distributed (i.i.d.) whose common probability distribution is at least Log-H\"older continuous.

[1]  T. Ekanga Anderson localization for weakly interacting multi-particle models in the continuum , 2016, 1611.10345.

[2]  V. Chulaevsky Exponential decay of eigenfunctions in a continuous multi-particle Anderson model with sub-exponentially decaying interaction , 2014, 1408.4646.

[3]  Michael Fauser,et al.  Multiparticle localization for disordered systems on continuous space via the fractional moment method , 2014, 1402.5832.

[4]  Mostafa Sabri Anderson Localization for a Multi-Particle Quantum Graph , 2012, 1201.6247.

[5]  T. Ekanga Localization at low energies in the multi-particle tight-binding model , 2012 .

[6]  T. Ekanga Anderson localization at low energies in the multi-particle tight-binding model , 2012, 1201.2339.

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

[8]  T. Ekanga On two-particle Anderson localization at low energies , 2011, 1203.1207.

[9]  M. Aizenman,et al.  Complete Dynamical Localization in Disordered Quantum Multi-Particle Systems , 2009, 0909.5432.

[10]  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.

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

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

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

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

[15]  A. Klein,et al.  Operator kernel estimates for functions of generalized Schrödinger operators , 2002 .

[16]  P. Stollmann,et al.  Multi-scale analysis implies strong dynamical localization , 1999, math-ph/9912002.

[17]  A. Klein,et al.  A new proof of localization in the Anderson tight binding model , 1989 .

[18]  Peter Stollmann,et al.  Caught by disorder , 2001 .