Blumenthal's zero–one law

In the mathematical theory of probability, Blumenthal's zero–one law,^[1] named after Robert McCallum Blumenthal, is a statement about the nature of the beginnings of right continuous Feller process. Loosely, it states that any right continuous Feller process on ${\displaystyle [0,\mathrm{\infty })}$ starting from deterministic point has also deterministic initial movement.

Suppose that ${\displaystyle X=(X_t:t\ge 0)}$ is an adapted right continuous Feller process on a probability space ${\displaystyle (\mathrm{\Omega },{ℱ},\{{{ℱ}}_t{\}}_{t\ge 0},\mathbb{\mathbb{P}})}$ such that ${\displaystyle X_0}$ is constant with probability one. Let ${\displaystyle {{ℱ}}_t^X:=\sigma (X_s;s\le t),{{ℱ}}_{t^{+}}^X:=\bigcap _{s>t}{{ℱ}}_s^X}$. Then any event in the germ sigma algebra ${\displaystyle \mathrm{\Lambda }\in {{ℱ}}_{0+}^X}$ has either ${\displaystyle \mathbb{\mathbb{P}}(\mathrm{\Lambda })=0}$ or ${\displaystyle \mathbb{\mathbb{P}}(\mathrm{\Lambda })=1.}$

Suppose that ${\displaystyle X=(X_t:t\ge 0)}$ is an adapted stochastic process on a probability space ${\displaystyle (\mathrm{\Omega },{ℱ},\{{{ℱ}}_t{\}}_{t\ge 0},\mathbb{\mathbb{P}})}$ such that ${\displaystyle X_0}$ is constant with probability one. If ${\displaystyle X}$ has Markov property with respect to the filtration ${\displaystyle \{{{ℱ}}_{t^{+}}{\}}_{t\ge 0}}$ then any event ${\displaystyle \mathrm{\Lambda }\in {{ℱ}}_{0+}^X}$ has either ${\displaystyle \mathbb{\mathbb{P}}(\mathrm{\Lambda })=0}$ or ${\displaystyle \mathbb{\mathbb{P}}(\mathrm{\Lambda })=1.}$ Note that every right continuous Feller process on a probability space ${\displaystyle (\mathrm{\Omega },{ℱ},\{{{ℱ}}_t{\}}_{t\ge 0},\mathbb{\mathbb{P}})}$ has strong Markov property with respect to the filtration ${\displaystyle \{{{ℱ}}_{t^{+}}{\}}_{t\ge 0}}$.

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