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Randomly Perturbed Ergodic Averages

Dynamical Systems 2018-06-08 v1 Probability

Abstract

Convergence properties of random ergodic averages have been extensively studied in the literature. In these notes, we exploit a uniform estimate by Cohen \& Cuny who showed convergence of a series along randomly perturbed times for functions in L2L^2 with max(1,log(1+t))dμf<\int \max(1,\log (1+|t|)) d\mu_f<\infty. We prove universal pointwise convergence of a class of random averages along randomly perturbed times for L2L^2 functions with max(1,loglog(1+t))dμf<\int \max(1,\log\log(1+|t|)) d\mu_f<\infty. For averages with additional smoothing properties, we obtain a universal variational inequality as well as universal pointwise convergence of a series define by them for all functions in L2L^2.

Keywords

Cite

@article{arxiv.1806.02816,
  title  = {Randomly Perturbed Ergodic Averages},
  author = {JaeYong Choi and Karin Reinhold},
  journal= {arXiv preprint arXiv:1806.02816},
  year   = {2018}
}
R2 v1 2026-06-23T02:22:48.252Z