| Some properties of Brownian motion |
| 1. The increment Y(t+h) - Y(t) is normally distributed with mean 0 and standard deviation √h. |
| This is the normal increments property of Brownian motion. |
| 2. If t1 < t2 < t3 < t4,
then the increment |
| This is the independent increments property of Brownian motion. |
| 3. For all h > 0, the increment Y(t + h) - Y(t) is independent of t. |
| That is, Brownian motion is stationary. |
| 4. For any number u and any numbers s,t > 0, |
| Prob(Y(t + h) - Y(t) < u) = Prob(Y(s⋅(t + h)) - Y(s⋅t) <(√s)⋅u). |
| This is the self-affinity property of Brownian motion. |
| It can be interpreted as Y scales as √(time). |
| 5. With probability 1, Y(t) is continuous and Y(0) = 0. |
| 6. A Brownian path in n-dimensional space, n > 1, has dimension = 2. |
| 7. The graph (Y vs t) of one-dimensional Brownian motion has dimension 3/2. |
| 8. A Brownian path in the plane has double points, triple points, quadruple points, and multiple points of all orders. |
| 9. A Brownian path in 3-dimensional space has double points but no triple points. (With probability 1, a smooth curve in 3-dimensional space has no double points.) |
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