Bounds on the Lyapunov exponent via crude estimates on the density of states
Abstract
We study the Chirikov (standard) map at large coupling λ 1, and prove that the Lyapounov exponent of the associated Schroedinger operator is of order λ except for a set of energies of measure (-c λβ) for some 1 < β < 2. We also prove a similar (sharp) lower bound on the Lyapunov exponent (outside a small exceptional set of energies) for a large family of ergodic Schroedinger operators, the prime example being the d-dimensional skew shift.
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