Eigenvalue Statistics for higher rank Anderson model over Canopy tree

Abstract

This work is focused on the local eigenvalue statistics for the Anderson tight binding model with non-rank-one perturbations over the canopy tree, at large disorder. On the Hilbert space 2(C), where C is the canopy tree, the random operator we consider is C+Σy∈ Jωy Py, where C is the adjacency operator over the tree, \ωy\y∈ J are i.i.d real random variables following some absolutely continuous distribution having a bounded density with compact support, and Py are projections on 2(\x∈C: dist(y,x)< m0 \& y x\). For this operator, we show that, the eigenvalue-counting point process converges to compound Poisson process.