The Spectrum of a Schr\"odinger Operator With Small Quasi-Periodic Potential is Homogeneous
Abstract
We consider the quasi-periodic Schr\"odinger operator [H ](x) = -"(x) + V(x) (x) in L2(R), where the potential is given by V(x) = Σm ∈ Z \ 0 \ c(m) (2π i m ω x) with a Diophantine frequency vector ω = (ω1, …, ω) ∈ R and exponentially decaying Fourier coefficients |c(m)| (-0|m|). In the regime of small > 0 we show that the spectrum of the operator H is homogeneous in the sense of Carleson.
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