Jaksi\'c-Last Theorem for Higher Rank Perturbations
Abstract
We consider the generalized Anderson Model +Σn∈Nωn Pn, where N is a countable set, \ωn\n∈N are i.i.d random variables and Pn are rank N<∞ projections. For these models we prove theorem analogous to that of Jaksi\'c-Last on the equivalence of the trace measure σn(·)=tr(PnEHω(·)Pn) for n∈N a.e ω. Our model covers the dimer and polymer models.
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