Positive Lyapunov Exponents and a Large Deviation Theorem for Continuum Anderson Models, Briefly

David Damanik (Rice University); Fengpeng Wang (Ocean University of China); Jake Fillman (Virginia Tech); Tom VandenBoom (Yale University); Valmir Bucaj (United States Military Academy); Vitaly Gerbuz (Rice University); Zhenghe Zhang (UC Riverside)

arxiv: 1902.04642 · v2 · pith:IBZS2ZADnew · submitted 2019-02-12 · 🧮 math.SP · math-ph· math.DS· math.MP

Positive Lyapunov Exponents and a Large Deviation Theorem for Continuum Anderson Models, Briefly

Valmir Bucaj (United States Military Academy) , David Damanik (Rice University) , Jake Fillman (Virginia Tech) , Vitaly Gerbuz (Rice University) , Tom VandenBoom (Yale University) , Fengpeng Wang (Ocean University of China) , Zhenghe Zhang (UC Riverside) This is my paper

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keywords modelsandersoncontinuumdeviationlargelyapunovnotetheorem

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In this short note, we prove positivity of the Lyapunov exponent for 1D continuum Anderson models by leveraging some classical tools from inverse spectral theory. The argument is much simpler than the existing proof due to Damanik--Sims--Stolz, and it covers a wider variety of random models. Along the way we note that a Large Deviation Theorem holds uniformly on compacts.

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