Invariant measures for a single map edit

Theorem (Krylov–Bogolyubov). Let (X, T) be a compact, metrizable topological space and F : X → X a continuous map. Then F admits an invariant Borel probability measure.

That is, if Borel(X) denotes the Borel σ-algebra generated by the collection T of open subsets of X, then there exists a probability measure μ : Borel(X) → [0, 1] such that for any subset A ∈ Borel(X),

${\displaystyle \mu \left(F^{-1}(A)\right)=\mu (A).}$ 

In terms of the push forward, this states that

${\displaystyle F_{*}(\mu )=\mu .}$ 

Invariant measures for a Markov process edit

Let X be a Polish space and let ${\displaystyle P_{t},t\geq 0,}$  be the transition probabilities for a time-homogeneous Markov semigroup on X, i.e.

${\displaystyle \Pr[X_{t}\in A|X_{0}=x]=P_{t}(x,A).}$ 

Theorem (Krylov–Bogolyubov). If there exists a point ${\displaystyle x\in X}$  for which the family of probability measures { P_t(x, ·) | t > 0 } is uniformly tight and the semigroup (P_t) satisfies the Feller property, then there exists at least one invariant measure for (P_t), i.e. a probability measure μ on X such that

${\displaystyle (P_{t})_{\ast }(\mu )=\mu {\mbox{ for all }}t>0.}$ 

• For the 1st theorem: Ya. G. Sinai (Ed.) (1997): Dynamical Systems II. Ergodic Theory with Applications to Dynamical Systems and Statistical Mechanics. Berlin, New York: Springer-Verlag. ISBN 3-540-17001-4. (Section 1).
• For the 2nd theorem: G. Da Prato and J. Zabczyk (1996): Ergodicity for Infinite Dimensional Systems. Cambridge Univ. Press. ISBN 0-521-57900-7. (Section 3).

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