J. Dedecker, F. Merlevède, F. Pène
Published 2012-10-12, updated 2013-09-27Version 2
Let T be an ergodic automorphism of the d-dimensional torus T^d, and f be a continuous function from T^d to R^l. On the probability space T^d equipped with the Lebesgue-Haar measure, we prove the weak convergence of the sequential empirical process of the sequence (f o T^i)_{i \geq 1} under some mild conditions on the modulus of continuity of f. The proofs are based on new limit theorems and new inequalities for non-adapted sequences, and on new estimates of the conditional expectations of f with respect to a natural filtration.
A couple of remarks on the convergence of $σ$-fields on probability spaces
Regularity of Gaussian white noise on the d-dimensional torus
On the structure of Gaussian random variables
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