All couplings localization for quasiperiodic operators with Lipschitz monotone potentials
Abstract
We establish Anderson localization for quasiperiodic operator families of the form (H(x))(m)=(m+1)+(m-1)+λ v(x+mα)(m) for all λ>0 and all Diophantine α, provided that v is a 1-periodic function satisfying a Lipschitz monotonicity condition on [0,1). The localization is uniform on any energy interval on which Lyapunov exponent is bounded from below.
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