Multiplicity bound of Singular Spectrum for higher rank Anderson models

Abstract

In this work, we prove a bound on multiplicity of the singular spectrum for certain class of Anderson Hamiltonians. The class of operator is Hω=+Σn∈Zdωn Pn on the Hilbert space 2(Zd), where is discrete laplacian, Pn are projection onto 2(\x∈Zd:nili<xi≤ (ni+1)li\) for some l1,·s,ld∈N and \ωn\n are i.i.d real bounded random variables following absolutely continuous distribution. We prove that the multiplicity of singular spectrum is bounded above by 2d-d independent of \li\i=1d. When li+1∈ 2N3N for all i and gcd(li+1,lj+1)=1 for i≠ j, we also prove that the singular spectrum is simple.