Anderson localization for one-frequency quasi-periodic block operators with long-range interactions

Abstract

In this paper, we study the quasi-periodic operators Hε,ω(x): (Hε,ω(x))n=εΣk∈ZWkn-k+V(x+nω)n, where =\n\∈2(Z,Cl),\ V(x)=diag(v1(x),·s,vl(x)) with vi (1≤ i ≤ l) being real analytic functions on T=R/Z and Wk (k∈Z) being l× l matrices satisfying \|Wk\|≤ C0e-|k|. Using techniques developed by Bourgain and Goldstein [Ann. of Math. 152(3):835--879, 2000], we show that for |ε|≤ ε0(V,,l,C0) ( depending only on V,, l, C0) and x∈ R/Z, there is some full Lebesgue measure subset F of the Diophantine frequencies such that Hε,ω(x) exhibits Anderson localization if ω∈ F.