# Mixing and decorrelation in infinite measure: the case of the periodic   sinai billiard

**Authors:** Fran\c{c}oise P\`ene (LM)

arXiv: 1706.04461 · 2017-06-15

## TL;DR

This paper studies the mixing rates of observables in infinite measure dynamical systems, specifically focusing on the Z2-periodic Sinai billiard, and provides detailed asymptotic expansions depending on the horizon type.

## Contribution

It offers new results on mixing rates for the Sinai billiard, including first order mixing in infinite horizon and asymptotic expansions in finite horizon cases.

## Key findings

- Established first order mixing for infinite horizon Sinai billiard.
- Derived asymptotic expansions of all orders for finite horizon case.
- Analyzed the impact of horizon type on mixing rates.

## Abstract

We investigate the question of the rate of mixing for observables of a Z d-extension of a probability preserving dynamical system with good spectral properties. We state general mixing results, including expansions of every order. The main part of this article is devoted to the study of mixing rate for smooth observables of the Z 2-periodic Sinai billiard, with different kinds of results depending on whether the horizon is finite or infinite. We establish a first order mixing result when the horizon is infinite. In the finite horizon case, we establish an asymptotic expansion of every order, enabling the study of the mixing rate even for observables with null integrals.

## Full text

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## References

30 references — full list in the complete paper: https://tomesphere.com/paper/1706.04461/full.md

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Source: https://tomesphere.com/paper/1706.04461