Maximal ergodic theorem

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The maximal ergodic theorem is a theorem in ergodic theory, a discipline within mathematics.

Suppose that (X, \mathcal{B}, \mu) is a probability space, that T : X \to X is a (possibly noninvertible) measure-preserving transformation, and that f \in L^1(\mu). Define f * by

f^* = \sup_{N=1\ldots\infty} \frac1N \sum_{i=0}^{N-1} f \circ T^i.

Then the maximal ergodic theorem states that

 \int_{f^* > \lambda} f \,d\mu \ge \lambda \cdot \mu\{ f^* > \lambda\}

for any λ ∈ R.

This theorem is used to prove the point-wise ergodic theorem.

[edit] References

  • Keane, Michael & Petersen, Karl (2006), “Easy and nearly simultaneous proofs of the Ergodic Theorem and Maximal Ergodic Theorem”, Institute of Mathematical Statistics Lecture Notes - Monograph Series 48: 248–251, arXiv:math.DS/0608251, doi:10.1214/074921706000000266 .