Uniformity Aspects of SL(2,R) Cocycles and Applications to Schr\"odinger Operators Defined Over Boshernitzan Subshifts
Abstract
We consider continuous SL(2,R) valued cocycles over general dynamical systems and discuss a variety of uniformity notions. In particular, we provide a description of uniform one-parameter families of continuous SL(2,R) cocycles as Gδ-sets. These results are then applied to Schr\"odinger operators with dynamically defined potentials. In the case where the base dynamics is given by a subshift satisfying the Boshernitzan condition, we show that for a generic continuous sampling function, the associated Schr\"odinger cocycles are uniform for all energies and, in the aperiodic case, the spectrum is a Cantor set of zero Lebesgue measure.
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