Quantitative Quasiperiodicity
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by
Suddhasattwa Das,
Yoshitaka Saiki,
Evelyn Sander,
James A Yorke
2017
Abstract
The Birkhoff Ergodic Theorem concludes that time averages, i.e., Birkhoff
averages, Σ_n=0^N-1 f(x_n)/N of a function f along a length N
ergodic trajectory (x_n) of a function T converge to the space average
∫ f dμ, where μ is the unique invariant probability measure.
Convergence of the time average to the space average is slow. We introduce a
modified average of f(x_n) by giving very small weights to the "end" terms
when n is near 0 or N-1. When (x_n) is a trajectory on a quasiperiodic
torus and f and T are C^∞, we show that our weighted Birkhoff
averages converge 'super" fast to ∫ f dμ with respect to the number of
iterates N, i.e. with error decaying faster than N^-m for every integer
m. Our goal is to show that our weighted Birkhoff average is a powerful
computational tool, and this paper illustrates its use for several examples
where the quasiperiodic set is one or two dimensional. In particular, we
compute rotation numbers and conjugacies (i.e. changes of variables) and their
Fourier series, often with 30-digit accuracy.
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