English

Limit theorems for invariant distributions

Statistics Theory 2021-11-30 v2 Probability Statistics Theory

Abstract

A distributional symmetry is invariance of a distribution under a group of transformations. Exchangeability and stationarity are examples. We explain that a result of ergodic theory provides a law of large numbers: If the group satisfies suitable conditions, expectations can be estimated by averaging over subsets of transformations, and these estimators are strongly consistent. We show that, if a mixing condition holds, the averages also satisfy a central limit theorem, a Berry-Esseen bound, and concentration. These are extended further to apply to triangular arrays, to randomly subsampled averages, and to a generalization of U-statistics. As applications, we obtain new results on exchangeability, random fields, network models, and a class of marked point processes. We also establish asymptotic normality of the empirical entropy for a large class of processes. Some known results are recovered as special cases, and can hence be interpreted as an outcome of symmetry. The proofs adapt Stein's method.

Keywords

Cite

@article{arxiv.1806.10661,
  title  = {Limit theorems for invariant distributions},
  author = {Morgane Austern and Peter Orbanz},
  journal= {arXiv preprint arXiv:1806.10661},
  year   = {2021}
}
R2 v1 2026-06-23T02:44:03.503Z