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+---
+title: "Martingale"
+firstLetter: "M"
+publishDate: 2021-10-31
+categories:
+- Mathematics
+
+date: 2021-10-18T10:01:46+02:00
+draft: false
+markup: pandoc
+---
+
+# Martingale
+
+A **martingale** is a type of stochastic process
+(i.e. a time-indexed [random variable](/know/concept/random-variable/))
+with important and useful properties,
+especially for stochastic calculus.
+
+For a stochastic process $\{ M_t : t \ge 0 \}$
+on a probability space $(\Omega, \mathcal{F}, P)$ with filtration $\{ \mathcal{F}_t \}$
+(see [$\sigma$-algebra](/know/concept/sigma-algebra/)),
+then $\{ M_t \}$ is a martingale if it satisfies all of the following:
+
+1. $M_t$ is $\mathcal{F}_t$-adapted, meaning
+ the filtration $\mathcal{F}_t$ contains enough information
+ to reconstruct the current and all past values of $M_t$.
+2. For all times $t \ge 0$, the expectation value exists $\mathbf{E}(M_t) < \infty$.
+3. For all $s, t$ satisfying $0 \le s \le t$,
+ the [conditional expectation](/know/concept/conditional-expectation/)
+ $\mathbf{E}(M_t | \mathcal{F}_s) = M_s$,
+ meaning the increment $M_t \!-\! M_s$ is always expected
+ to be zero $\mathbf{E}(M_t \!-\! M_s | \mathcal{F}_s) = 0$.
+
+The last condition is called the **martingale property**,
+and essentially means that a martingale is an unbiased random walk.
+Accordingly, the [Wiener process](/know/concept/wiener-process/) $\{ B_t \}$
+(Brownian motion) is a prime example of a martingale
+(with respect to its own filtration),
+since each of its increments $B_t \!-\! B_s$ has mean $0$ by definition.
+
+Modifying property (3) leads to two common generalizations.
+The stochastic process $\{ M_t \}$ above is a **submartingale**
+if the current value is a lower bound for the expectation:
+
+3. For $0 \le s \le t$, the conditional expectation $\mathbf{E}(M_t | \mathcal{F}_s) \ge M_s$.
+
+Analogouly, $\{ M_t \}$ is a **supermartingale**
+if the current value is an upper bound instead:
+
+3. For $0 \le s \le t$, the conditional expectation $\mathbf{E}(M_t | \mathcal{F}_s) \le M_s$.
+
+Clearly, submartingales and supermartingales are *biased* random walks,
+since they will tend to increase and decrease with time, respectively.
+
+
+
+## References
+1. U.F. Thygesen,
+ *Lecture notes on diffusions and stochastic differential equations*,
+ 2021, Polyteknisk Kompendie.