Measure-preserving dynamical system

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In mathematics, a measure-preserving dynamical system is an object of study in the abstract formulation of ergodic theory.

It is defined as a probability space and a measure-preserving transformation on it. In more detail, it is a system

$(X, \mathcal{B}, T, m)$

with the following structure:

X

is a set,

$\mathcal{B}$ is a

σ

-algebra over

X

$m:\mathcal{B}\rightarrow[0,1]$ is a probability measure, so that

m (X) = 1

, and

$T:X\rightarrow X$ is a measurable transformation which preserves the measure

m

, i. e. each measurable $A\subseteq X$ satisfies

m (T - 1 A) = m (A).

For example, m could be the normalised angle measure dθ/2π on the unit circle, and T a rotation.

One may wonder why the seemingly simpler identity

m (T (A)) = m (A)

is not used. Here is the problem: suppose T : [0, 1] → [0, 1] is defined by T(x) = (4x mod 1), i.e., T(x) is the "fractional part" of 4x. Then the interval [0.01, 0.02] is mapped to an interval four times as long as itself, but nonetheless the measure of T⁻¹( [0.04, 0.08] ) = [0.01, 0.02] ∪ [0.251, 0.252] ∪ [0.501, 0.502] ∪ [0.751, 0.752] is no different from the measure of [0.04, 0.08]. That hypothesis suffices for the proofs of ergodic theorems. This transformation is measure-preserving.

Categories: Ergodic theory

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01-04-2007 01:21:04

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