Diffusion limit for a slow-fast standard map

Abstract

Consider the map (x, y) (x + ε-α (2π x) + ε-1-αz, z + ε (2π x)), which is conjugate to the Chirikov standard map with a large parameter. The parameter value α = 1 is related to "scattering by resonance" phenomena. For suitable α, we obtain a central limit theorem for the slow variable z for a (Lebesgue) random initial condition. The result is proved by conjugating to the Chirikov standard map and utilizing the formalism of standard pairs. Our techniques also yield for the Chirikov standard map a related limit theorem and a "finite-time" decay of correlations result.