Your search keyword '"37A50"' showing total 2 results

1. Parametric Furstenberg Theorem on random products of SL(2,R) matrices

Author

Gorodetski, A and Kleptsyn, V

Subjects

Random matrix products, Furstenberg Theorem, Lyapunov exponents, Anderson Localization, math.DS, math.PR, math.SP, 37H15, 60H25, 47B80, 37A50, 82C44, 37D25, 60B20, Pure Mathematics, General Mathematics

Abstract

We consider random products of SL(2,R) matrices that depend on a parameter in a non-uniformly hyperbolic regime. We show that if the dependence on the parameter is monotone then almost surely the random product has upper (limsup) Lyapunov exponent that is equal to the value prescribed by the Furstenberg Theorem (and hence positive) for all parameters, but the lower (liminf) Lyapunov exponent is equal to zero for a dense Gδ set of parameters of zero Hausdorff dimension. As a byproduct of our methods, we provide a purely geometrical proof of Spectral Anderson Localization for discrete Schrödinger operators with random potentials (including the Anderson-Bernoulli model) on a one dimensional lattice.

Published

2021

2. Parametric Furstenberg Theorem on random products of S L ( 2 , R ) matrices

Author

Gorodetski, Anton and Kleptsyn, Victor

Subjects

Applied Mathematics, Mathematical Sciences, Pure Mathematics, Statistics, Random matrix products, Furstenberg Theorem, Lyapunov exponents, Anderson Localization, math.DS, math.PR, math.SP, 37H15, 60H25, 47B80, 37A50, 82C44, 37D25, 60B20, General Mathematics, Applied mathematics, Mathematical physics, Pure mathematics

Abstract

We consider random products of SL(2,R) matrices that depend on a parameter in a non-uniformly hyperbolic regime. We show that if the dependence on the parameter is monotone then almost surely the random product has upper (limsup) Lyapunov exponent that is equal to the value prescribed by the Furstenberg Theorem (and hence positive) for all parameters, but the lower (liminf) Lyapunov exponent is equal to zero for a dense Gδ set of parameters of zero Hausdorff dimension. As a byproduct of our methods, we provide a purely geometrical proof of Spectral Anderson Localization for discrete Schrödinger operators with random potentials (including the Anderson-Bernoulli model) on a one dimensional lattice.

Published

2021